linalg.py 122.0 KB
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#   Copyright (c) 2020 PaddlePaddle Authors. All Rights Reserved.
#
# Licensed under the Apache License, Version 2.0 (the "License");
# you may not use this file except in compliance with the License.
# You may obtain a copy of the License at
#
#     http://www.apache.org/licenses/LICENSE-2.0
#
# Unless required by applicable law or agreed to in writing, software
# distributed under the License is distributed on an "AS IS" BASIS,
# WITHOUT WARRANTIES OR CONDITIONS OF ANY KIND, either express or implied.
# See the License for the specific language governing permissions and
# limitations under the License.
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import numpy as np
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import paddle
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from paddle import _C_ops
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from paddle.common_ops_import import VarDesc

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from ..fluid.data_feeder import (
    check_dtype,
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    check_type,
    check_variable_and_dtype,
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)
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from ..framework import LayerHelper, in_dygraph_mode
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from ..static import Variable
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from .creation import full
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from .logic import logical_not
from .manipulation import cast
from .math import add, multiply
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__all__ = []

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# Consistent with kDefaultDim from C++ Backend
K_DEFAULT_DIM = 9

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def transpose(x, perm, name=None):
    """
    Permute the data dimensions of `input` according to `perm`.

    The `i`-th dimension  of the returned tensor will correspond to the
    perm[i]-th dimension of `input`.

    Args:
        x (Tensor): The input Tensor. It is a N-D Tensor of data types bool, float32, float64, int32.
        perm (list|tuple): Permute the input according to the data of perm.
        name (str): The name of this layer. It is optional.

    Returns:
        Tensor: A transposed n-D Tensor, with data type being bool, float32, float64, int32, int64.

    For Example:

        .. code-block:: text

         x = [[[ 1  2  3  4] [ 5  6  7  8] [ 9 10 11 12]]
             [[13 14 15 16] [17 18 19 20] [21 22 23 24]]]
         shape(x) =  [2,3,4]

         # Example 1
         perm0 = [1,0,2]
         y_perm0 = [[[ 1  2  3  4] [13 14 15 16]]
                   [[ 5  6  7  8]  [17 18 19 20]]
                   [[ 9 10 11 12]  [21 22 23 24]]]
         shape(y_perm0) = [3,2,4]

         # Example 2
         perm1 = [2,1,0]
         y_perm1 = [[[ 1 13] [ 5 17] [ 9 21]]
                   [[ 2 14] [ 6 18] [10 22]]
                   [[ 3 15]  [ 7 19]  [11 23]]
                   [[ 4 16]  [ 8 20]  [12 24]]]
         shape(y_perm1) = [4,3,2]

    Examples:

        .. code-block:: python

            import paddle

            x = paddle.randn([2, 3, 4])
            x_transposed = paddle.transpose(x, perm=[1, 0, 2])
            print(x_transposed.shape)
            # [3L, 2L, 4L]

    """
    if in_dygraph_mode():
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        return _C_ops.transpose(x, perm)
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    else:
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        check_variable_and_dtype(
            x,
            'x',
            [
                'bool',
                'float16',
                'float32',
                'float64',
                'int32',
                'int64',
                'complex64',
                'complex128',
            ],
            'transpose',
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        )
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        check_type(perm, 'perm', (list, tuple), 'transpose')
        if isinstance(perm, tuple):
            perm = list(perm)
        if len(perm) != len(x.shape):
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            raise ValueError(
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                "Input(perm) is the permutation of dimensions of Input(x), "
                "its length should be equal to dimensions of Input(x), "
                "but received dimension of Input(x) is %s, "
                "the length of Input(perm) is %s." % (len(x.shape), len(perm))
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            )
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        for idx, dim in enumerate(perm):
            if dim >= len(x.shape):
                raise ValueError(
                    "Each element in Input(perm) should be less than Input(x)'s dimension, "
                    "but %d-th element in Input(perm) is %d which exceeds Input(x)'s "
                    "dimension %d." % (idx, perm[idx], len(x.shape))
                )
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        helper = LayerHelper('transpose', **locals())
        out = helper.create_variable_for_type_inference(x.dtype)
        x_shape = helper.create_variable_for_type_inference(x.dtype)
        helper.append_op(
            type='transpose2',
            inputs={'X': [x]},
            outputs={'Out': [out], 'XShape': [x_shape]},
            attrs={'axis': perm},
        )
        return out
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def matmul(x, y, transpose_x=False, transpose_y=False, name=None):
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    """
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    Applies matrix multiplication to two tensors. `matmul` follows
    the complete broadcast rules,
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    and its behavior is consistent with `np.matmul`.
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    Currently, the input tensors' number of dimensions can be any, `matmul` can be used to
    achieve the `dot`, `matmul` and `batchmatmul`.
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    The actual behavior depends on the shapes of :math:`x`, :math:`y` and the
    flag values of :attr:`transpose_x`, :attr:`transpose_y`. Specifically:

    - If a transpose flag is specified, the last two dimensions of the tensor
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      are transposed. If the tensor is ndim-1 of shape, the transpose is invalid. If the tensor
      is ndim-1 of shape :math:`[D]`, then for :math:`x` it is treated as :math:`[1, D]`, whereas
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      for :math:`y` it is the opposite: It is treated as :math:`[D, 1]`.

    The multiplication behavior depends on the dimensions of `x` and `y`. Specifically:

    - If both tensors are 1-dimensional, the dot product result is obtained.

    - If both tensors are 2-dimensional, the matrix-matrix product is obtained.

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    - If the `x` is 1-dimensional and the `y` is 2-dimensional,
      a `1` is prepended to its dimension in order to conduct the matrix multiply.
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      After the matrix multiply, the prepended dimension is removed.
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    - If the `x` is 2-dimensional and `y` is 1-dimensional,
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      the matrix-vector product is obtained.

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    - If both arguments are at least 1-dimensional and at least one argument
      is N-dimensional (where N > 2), then a batched matrix multiply is obtained.
      If the first argument is 1-dimensional, a 1 is prepended to its dimension
      in order to conduct the batched matrix multiply and removed after.
      If the second argument is 1-dimensional, a 1 is appended to its
      dimension for the purpose of the batched matrix multiple and removed after.
      The non-matrix (exclude the last two dimensions) dimensions are
      broadcasted according the broadcast rule.
      For example, if input is a (j, 1, n, m) tensor and the other is a (k, m, p) tensor,
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      out will be a (j, k, n, p) tensor.
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    Args:
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        x (Tensor): The input tensor which is a Tensor.
        y (Tensor): The input tensor which is a Tensor.
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        transpose_x (bool, optional): Whether to transpose :math:`x` before multiplication.
        transpose_y (bool, optional): Whether to transpose :math:`y` before multiplication.
        name(str, optional): A name for this layer(optional). If set None, the layer
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            will be named automatically.

    Returns:
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        Tensor: The output Tensor.
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    Examples:

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        .. code-block:: python

            import paddle

            # vector * vector
            x = paddle.rand([10])
            y = paddle.rand([10])
            z = paddle.matmul(x, y)
            print(z.shape)
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            # (1,)
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            # matrix * vector
            x = paddle.rand([10, 5])
            y = paddle.rand([5])
            z = paddle.matmul(x, y)
            print(z.shape)
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            # (10,)
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            # batched matrix * broadcasted vector
            x = paddle.rand([10, 5, 2])
            y = paddle.rand([2])
            z = paddle.matmul(x, y)
            print(z.shape)
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            # (10, 5)
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            # batched matrix * batched matrix
            x = paddle.rand([10, 5, 2])
            y = paddle.rand([10, 2, 5])
            z = paddle.matmul(x, y)
            print(z.shape)
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            # (10, 5, 5)
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            # batched matrix * broadcasted matrix
            x = paddle.rand([10, 1, 5, 2])
            y = paddle.rand([1, 3, 2, 5])
            z = paddle.matmul(x, y)
            print(z.shape)
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            # (10, 3, 5, 5)
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    """
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    if in_dygraph_mode():
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        return _C_ops.matmul(x, y, transpose_x, transpose_y)
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    else:
        attrs = {
            'trans_x': transpose_x,
            'trans_y': transpose_y,
        }
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        def __check_input(x, y):
            var_names = {'x': x, 'y': y}
            for name, val in var_names.items():
                check_variable_and_dtype(
                    val,
                    name,
                    [
                        'float16',
                        'float32',
                        'float64',
                        'complex64',
                        'complex128',
                    ],
                    'matmul',
                )
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        __check_input(x, y)
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        helper = LayerHelper('matmul_v2', **locals())
        out = helper.create_variable_for_type_inference(dtype=x.dtype)
        helper.append_op(
            type='matmul_v2',
            inputs={'X': x, 'Y': y},
            outputs={'Out': out},
            attrs=attrs,
        )
        return out
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def norm(x, p='fro', axis=None, keepdim=False, name=None):
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    """
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    Returns the matrix norm (Frobenius) or vector norm (the 1-norm, the Euclidean
    or 2-norm, and in general the p-norm for p > 0) of a given tensor.

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    Note:
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        This norm API is different from `numpy.linalg.norm`.
        This api supports high-order input tensors (rank >= 3), and certain axis need to be pointed out to calculate the norm.
        But `numpy.linalg.norm` only supports 1-D vector or 2-D matrix as input tensor.
        For p-order matrix norm, this api actually treats matrix as a flattened vector to calculate the vector norm, NOT REAL MATRIX NORM.

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    Args:
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        x (Tensor): The input tensor could be N-D tensor, and the input data
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            type could be float32 or float64.
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        p (float|string, optional): Order of the norm. Supported values are `fro`, `0`, `1`, `2`,
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            `inf`, `-inf` and any positive real number yielding the corresponding p-norm. Not supported: ord < 0 and nuclear norm.
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            Default value is `fro`.
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        axis (int|list|tuple, optional): The axis on which to apply norm operation. If axis is int
            or list(int)/tuple(int)  with only one element, the vector norm is computed over the axis.
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            If `axis < 0`, the dimension to norm operation is rank(input) + axis.
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            If axis is a list(int)/tuple(int) with two elements, the matrix norm is computed over the axis.
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            Default value is `None`.
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        keepdim (bool, optional): Whether to reserve the reduced dimension in the
            output Tensor. The result tensor will have fewer dimension
            than the :attr:`input` unless :attr:`keepdim` is true, default
            value is False.
        name (str, optional): The default value is None. Normally there is no need for
            user to set this property. For more information, please refer to :ref:`api_guide_Name`.

    Returns:
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        Tensor: results of norm operation on the specified axis of input tensor,
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        it's data type is the same as input's Tensor.
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    Examples:
        .. code-block:: python
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            import paddle
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            x = paddle.arange(24, dtype="float32").reshape([2, 3, 4]) - 12
            # x: Tensor(shape=[2, 3, 4], dtype=float32, place=Place(cpu), stop_gradient=True,
            #          [[[-12., -11., -10., -9. ],
            #            [-8. , -7. , -6. , -5. ],
            #            [-4. , -3. , -2. , -1. ]],

            #           [[ 0. ,  1. ,  2. ,  3. ],
            #            [ 4. ,  5. ,  6. ,  7. ],
            #            [ 8. ,  9. ,  10.,  11.]]])
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            # compute frobenius norm along last two dimensions.
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            out_fro = paddle.linalg.norm(x, p='fro', axis=[0,1])
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            # out_fro: Tensor(shape=[4], dtype=float32, place=Place(cpu), stop_gradient=True,
            #                 [17.43559647, 16.91153526, 16.73320007, 16.91153526])
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            # compute 2-order vector norm along last dimension.
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            out_pnorm = paddle.linalg.norm(x, p=2, axis=-1)
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            # out_pnorm: Tensor(shape=[2, 3], dtype=float32, place=Place(cpu), stop_gradient=True,
            #                [[21.11871147, 13.19090557, 5.47722578 ],
            #                 [3.74165750 , 11.22497177, 19.13112640]])
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            # compute 2-order  norm along [0,1] dimension.
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            out_pnorm = paddle.linalg.norm(x, p=2, axis=[0,1])
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            # out_pnorm: Tensor(shape=[4], dtype=float32, place=Place(cpu), stop_gradient=True,
            #                  [17.43559647, 16.91153526, 16.73320007, 16.91153526])
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            # compute inf-order  norm
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            out_pnorm = paddle.linalg.norm(x, p=float("inf"))
            # out_pnorm  = Tensor(shape=[1], dtype=float32, place=Place(cpu), stop_gradient=True,
            #                    [12.])

            out_pnorm = paddle.linalg.norm(x, p=float("inf"), axis=0)
            # out_pnorm: Tensor(shape=[3, 4], dtype=float32, place=Place(cpu), stop_gradient=True,
            #                 [[12., 11., 10., 9. ],
            #                  [8. , 7. , 6. , 7. ],
            #                  [8. , 9. , 10., 11.]])
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            # compute -inf-order  norm
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            out_pnorm = paddle.linalg.norm(x, p=-float("inf"))
            # out_pnorm: Tensor(shape=[1], dtype=float32, place=Place(cpu), stop_gradient=True,
            #                  [0.])

            out_pnorm = paddle.linalg.norm(x, p=-float("inf"), axis=0)
            # out_pnorm: Tensor(shape=[3, 4], dtype=float32, place=Place(cpu), stop_gradient=True,
            #                  [[0., 1., 2., 3.],
            #                  [4., 5., 6., 5.],
            #                  [4., 3., 2., 1.]])
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    """

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    def frobenius_norm(input, dim=None, keepdim=False, name=None):
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        """
        The frobenius norm OP is to calculate the frobenius norm of certain two dimensions of Tensor `input`.
        Args:
          input (Variable): Tensor, data type float32, float64.
          dim (list, optional): None for last two dimensions.
          keepdim (bool, optional): Whether keep the dimensions as the `input`, Default False.
        """
        if dim is not None and not (isinstance(dim, list) and len(dim) == 2):
            raise ValueError(
                "The dim of frobenius norm op should be None or two elements list!"
            )
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        if in_dygraph_mode():
            if dim is None:
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                return _C_ops.frobenius_norm(input, [], keepdim, True)
            return _C_ops.frobenius_norm(input, dim, keepdim, False)
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        else:
            attrs = {'dim': dim, 'keep_dim': keepdim, 'reduce_all': False}
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            if dim is None:
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                attrs['reduce_all'] = True
            check_variable_and_dtype(
                input, 'input', ['float32', 'float64'], 'frobenius_norm'
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            )
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            helper = LayerHelper('frobenius_norm', **locals())
            out = helper.create_variable_for_type_inference(
                dtype=helper.input_dtype()
            )
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            helper.append_op(
                type='frobenius_norm',
                inputs={'X': input},
                outputs={'Out': out},
                attrs=attrs,
            )
            return out
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    def vector_norm(
        input, porder=None, axis=None, keepdim=False, asvector=False, name=None
    ):
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        """
        Calculate the p-order vector norm for certain  dimension of Tensor `input`.
        Args:
          input (Variable): Tensor, data type float32, float64.
          porder (float, optional): None for porder=2.0.
          axis (int, optional): None for last dimension.
          keepdim (bool, optional): Whether keep the dimensions as the `input`, Default False.
        """
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        if in_dygraph_mode():
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            if axis is None:
                axis = -1
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            return _C_ops.p_norm(input, porder, axis, 1e-12, keepdim, asvector)
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        else:
            if porder is not None:
                check_type(porder, 'porder', (float, int), 'p_norm')
            if axis is not None:
                check_type(axis, 'axis', (int), 'p_norm')
            check_variable_and_dtype(
                input, 'input', ['float32', 'float64'], 'p_norm'
            )
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            attrs = {
                'axis': axis if axis is not None else -1,
                'porder': float(porder) if porder is not None else 2.0,
                'keepdim': keepdim,
                'asvector': asvector,
                'epsilon': 1e-12,
            }
            helper = LayerHelper('p_norm', **locals())
            out = helper.create_variable_for_type_inference(
                dtype=helper.input_dtype()
            )
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            helper.append_op(
                type='p_norm',
                inputs={'X': input},
                outputs={'Out': out},
                attrs=attrs,
            )
            return out
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    def inf_norm(
        input, porder=None, axis=axis, keepdim=False, asvector=False, name=None
    ):
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        if in_dygraph_mode():
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            out = _C_ops.abs(input)
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            if porder == np.float64('inf'):
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                return _C_ops.max(out, axis, keepdim)
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            else:
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                return _C_ops.min(out, axis, keepdim)
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        else:
            helper = LayerHelper('inf_norm', **locals())
            out = helper.create_variable_for_type_inference(
                dtype=helper.input_dtype()
            )
            helper.append_op(
                type='abs', inputs={'X': input}, outputs={'Out': out}
            )
            reduce_out = helper.create_variable_for_type_inference(
                dtype=helper.input_dtype()
            )
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            reduce_all = (
                True if axis is None or axis == [] or asvector else False
            )
            axis = axis if axis is not None and axis != [] else [0]
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            reduce_type = (
                'reduce_max' if porder == np.float64('inf') else 'reduce_min'
            )
            helper.append_op(
                type=reduce_type,
                inputs={'X': out},
                outputs={'Out': reduce_out},
                attrs={
                    'dim': axis,
                    'keep_dim': keepdim,
                    'reduce_all': reduce_all,
                },
            )
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            return reduce_out
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    def p_matrix_norm(input, porder=1.0, axis=axis, keepdim=False, name=None):
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        """
        NOTE:
            This function actually treats the matrix as flattened vector to calculate vector norm instead of matrix norm.
        """
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        if in_dygraph_mode():
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            abs_out = _C_ops.abs(input)
            pow_out = _C_ops.pow(abs_out, porder)
            sum_out = _C_ops.sum(pow_out, axis, None, keepdim)
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            out = _C_ops.pow(sum_out, float(1.0 / porder))
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            return out

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        block = LayerHelper('norm', **locals())
        out = block.create_variable_for_type_inference(
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            dtype=block.input_dtype()
        )
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        abs_out = block.create_variable_for_type_inference(
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            dtype=block.input_dtype()
        )
        block.append_op(
            type='abs', inputs={'X': input}, outputs={'Out': abs_out}
        )
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        pow_out = block.create_variable_for_type_inference(
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            dtype=block.input_dtype()
        )
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        block.append_op(
            type='pow',
            inputs={'X': abs_out},
            outputs={'Out': pow_out},
            attrs={'factor': porder},
        )
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        sum_out = block.create_variable_for_type_inference(
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            dtype=block.input_dtype()
        )
        block.append_op(
            type='reduce_sum',
            inputs={'X': pow_out},
            outputs={'Out': sum_out},
            attrs={
                'dim': axis,
                'keep_dim': keepdim,
                'reduce_all': True if axis is None else False,
            },
        )
        block.append_op(
            type='pow',
            inputs={'X': sum_out},
            outputs={'Out': out},
            attrs={'factor': float(1.0 / porder)},
        )
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        return out

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    if axis is None and p is not None:
        if isinstance(p, str):
            if p == "fro":
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                return frobenius_norm(x, dim=axis, keepdim=keepdim, name=name)
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            else:
                raise ValueError(
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                    "only valid string values are 'fro', found {}".format(p)
                )
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        elif isinstance(p, (int, float)):
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            return vector_norm(
                x,
                porder=p,
                axis=axis,
                keepdim=keepdim,
                asvector=True,
                name=name,
            )
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        else:
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            raise ValueError(
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                "only valid p type is string or float, found {}".format(type(p))
            )
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    if isinstance(axis, tuple):
        axis = list(axis)
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    if isinstance(axis, list) and len(axis) == 1:
        axis = axis[0]

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    # calculate vector norm, where axis is int or list with only one integer
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    if isinstance(axis, int):
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        if isinstance(p, str):
            if p == "fro":
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                return vector_norm(
                    x,
                    porder=2,
                    axis=axis,
                    keepdim=keepdim,
                    asvector=False,
                    name=name,
                )
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            else:
                raise ValueError(
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                    "only valid string values are 'fro', found {}".format(p)
                )
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        elif isinstance(p, (int, float)):
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            return vector_norm(
                x,
                axis=axis,
                porder=p,
                keepdim=keepdim,
                asvector=False,
                name=name,
            )
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        else:
            raise ValueError(
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                "unspport p for p-order vector norm. except float, found {}".format(
                    p
                )
            )
    # calculate matrix norm, where axis is list with two integers
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    elif isinstance(axis, list) and len(axis) == 2:
        if p == "fro":
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            return frobenius_norm(x, dim=axis, keepdim=keepdim, name=name)
        elif p == np.inf or p == -np.inf:
            return inf_norm(x, porder=p, axis=axis, keepdim=keepdim, name=name)
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        elif p == 0:
            raise ValueError(
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                "just suport axis type int or list (length of list <=1) if p = 0, found {}".format(
                    axis
                )
            )
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        else:
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            return p_matrix_norm(
                x, porder=p, axis=axis, keepdim=keepdim, name=name
            )
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    else:
        raise ValueError(
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            "except axis type int or list (length of list <=2), found {}".format(
                axis
            )
        )
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def dist(x, y, p=2, name=None):
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    r"""
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    Returns the p-norm of (x - y). It is not a norm in a strict sense, only as a measure
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    of distance. The shapes of x and y must be broadcastable. The definition is as follows, for
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    details, please refer to the `Introduction to Tensor <../../guides/beginner/tensor_en.html#chapter5-broadcasting-of-tensor>`_:
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    - Each input has at least one dimension.
    - Match the two input dimensions from back to front, the dimension sizes must either be equal, one of them is 1, or one of them does not exist.

    Where, z = x - y, the shapes of x and y are broadcastable, then the shape of z can be
    obtained as follows:

    1. If the number of dimensions of x and y are not equal, prepend 1 to the dimensions of the
    tensor with fewer dimensions.

    For example, The shape of x is [8, 1, 6, 1], the shape of y is [7, 1, 5], prepend 1 to the
    dimension of y.

    x (4-D Tensor):  8 x 1 x 6 x 1

    y (4-D Tensor):  1 x 7 x 1 x 5

    2. Determine the size of each dimension of the output z: choose the maximum value from the
    two input dimensions.

    z (4-D Tensor):  8 x 7 x 6 x 5

    If the number of dimensions of the two inputs are the same, the size of the output can be
    directly determined in step 2. When p takes different values, the norm formula is as follows:
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    When p = 0, defining $0^0=0$, the zero-norm of z is simply the number of non-zero elements of z.

    .. math::

        ||z||_{0}=\lim_{p \\rightarrow 0}\sum_{i=1}^{m}|z_i|^{p}

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    When p = inf, the inf-norm of z is the maximum element of the absolute value of z.
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    .. math::

        ||z||_\infty=\max_i |z_i|

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    When p = -inf, the negative-inf-norm of z is the minimum element of the absolute value of z.
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    .. math::

        ||z||_{-\infty}=\min_i |z_i|

    Otherwise, the p-norm of z follows the formula,

    .. math::

        ||z||_{p}=(\sum_{i=1}^{m}|z_i|^p)^{\\frac{1}{p}}

    Args:
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        x (Tensor): 1-D to 6-D Tensor, its data type is float32 or float64.
        y (Tensor): 1-D to 6-D Tensor, its data type is float32 or float64.
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        p (float, optional): The norm to be computed, its data type is float32 or float64. Default: 2.
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        name (str, optional): The default value is `None`. Normally there is no need for
            user to set this property. For more information, please refer to :ref:`api_guide_Name`.
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    Returns:
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        Tensor: Tensor that is the p-norm of (x - y).
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    Examples:
        .. code-block:: python

            import paddle

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            x = paddle.to_tensor([[3, 3],[3, 3]], dtype="float32")
            y = paddle.to_tensor([[3, 3],[3, 1]], dtype="float32")
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            out = paddle.dist(x, y, 0)
            print(out) # out = [1.]
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            out = paddle.dist(x, y, 2)
            print(out) # out = [2.]
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            out = paddle.dist(x, y, float("inf"))
            print(out) # out = [2.]
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            out = paddle.dist(x, y, float("-inf"))
            print(out) # out = [0.]
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    """
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    if in_dygraph_mode():
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        return _C_ops.dist(x, y, p)
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    check_variable_and_dtype(x, 'dtype', ['float32', 'float64'], 'dist')
    check_variable_and_dtype(y, 'dtype', ['float32', 'float64'], 'dist')
    check_type(p, 'p', (float, int), 'dist')
    helper = LayerHelper("dist", **locals())
    out = helper.create_variable_for_type_inference(x.dtype)

    inputs = {"X": [x], "Y": [y]}
    outputs = {'Out': [out]}
    attrs = {"p": float(p)}
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    helper.append_op(
        type='dist', inputs=inputs, outputs={'Out': out}, attrs=attrs
    )
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    return out
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def cond(x, p=None, name=None):
    """

    Computes the condition number of a matrix or batches of matrices with respect to a matrix norm ``p``.

    Args:
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        x (Tensor): The input tensor could be tensor of shape ``(*, m, n)`` where ``*`` is zero or more batch dimensions
            for ``p`` in ``(2, -2)``, or of shape ``(*, n, n)`` where every matrix is invertible for any supported ``p``.
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            And the input data type could be ``float32`` or ``float64``.
        p (float|string, optional): Order of the norm. Supported values are `fro`, `nuc`, `1`, `-1`, `2`, `-2`,
            `inf`, `-inf`. Default value is `None`, meaning that the order of the norm is `2`.
        name (str, optional): The default value is `None`. Normally there is no need for
            user to set this property. For more information, please refer to :ref:`api_guide_Name`.

    Returns:
        Tensor: computing results of condition number, its data type is the same as input Tensor ``x``.

    Examples:
        .. code-block:: python

            import paddle

            x = paddle.to_tensor([[1., 0, -1], [0, 1, 0], [1, 0, 1]])

            # compute conditional number when p is None
            out = paddle.linalg.cond(x)
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            # Tensor(shape=[1], dtype=float32, place=Place(gpu:0), stop_gradient=True,
            #        [1.41421342])
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            # compute conditional number when order of the norm is 'fro'
            out_fro = paddle.linalg.cond(x, p='fro')
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            # Tensor(shape=[1], dtype=float32, place=Place(gpu:0), stop_gradient=True,
            #        [3.16227770])
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            # compute conditional number when order of the norm is 'nuc'
            out_nuc = paddle.linalg.cond(x, p='nuc')
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            # Tensor(shape=[1], dtype=float32, place=Place(gpu:0), stop_gradient=True,
            #        [9.24263859])
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            # compute conditional number when order of the norm is 1
            out_1 = paddle.linalg.cond(x, p=1)
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            # Tensor(shape=[1], dtype=float32, place=Place(gpu:0), stop_gradient=True,
            #        [2.])
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            # compute conditional number when order of the norm is -1
            out_minus_1 = paddle.linalg.cond(x, p=-1)
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            # Tensor(shape=[1], dtype=float32, place=Place(gpu:0), stop_gradient=True,
            #        [1.])
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            # compute conditional number when order of the norm is 2
            out_2 = paddle.linalg.cond(x, p=2)
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            # Tensor(shape=[1], dtype=float32, place=Place(gpu:0), stop_gradient=True,
            #        [1.41421342])
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            # compute conditional number when order of the norm is -1
            out_minus_2 = paddle.linalg.cond(x, p=-2)
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            # Tensor(shape=[1], dtype=float32, place=Place(gpu:0), stop_gradient=True,
            #        [0.70710683])
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            # compute conditional number when order of the norm is inf
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            out_inf = paddle.linalg.cond(x, p=float("inf"))
            # Tensor(shape=[1], dtype=float32, place=Place(gpu:0), stop_gradient=True,
            #        [2.])
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            # compute conditional number when order of the norm is -inf
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            out_minus_inf = paddle.linalg.cond(x, p=-float("inf"))
            # Tensor(shape=[1], dtype=float32, place=Place(gpu:0), stop_gradient=True,
            #        [1.])

            a = paddle.randn([2, 4, 4])
            # Tensor(shape=[2, 4, 4], dtype=float32, place=Place(gpu:0), stop_gradient=True,
            #        [[[-0.06784091, -0.07095790,  1.31792855, -0.58959651],
            #          [ 0.20818676, -0.85640615, -0.89998871, -1.47439921],
            #          [-0.49132481,  0.42250812, -0.77383220, -2.19794774],
            #          [-0.33551720, -1.70003879, -1.09795380, -0.63737559]],

            #         [[ 1.12026262, -0.16119350, -1.21157813,  2.74383283],
            #          [-0.15999718,  0.18798758, -0.69392562,  1.35720372],
            #          [-0.53013402, -2.26304483,  1.40843511, -1.02288902],
            #          [ 0.69533503,  2.05261683, -0.02251151, -1.43127477]]])

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            a_cond_fro = paddle.linalg.cond(a, p='fro')
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            # Tensor(shape=[2], dtype=float32, place=Place(gpu:0), stop_gradient=True,
            #        [8.86691189 , 75.23817444])

            b = paddle.randn([2, 3, 4])
            # Tensor(shape=[2, 3, 4], dtype=float32, place=Place(gpu:0), stop_gradient=True,
            #        [[[-0.43754861,  1.80796063, -0.78729683, -1.82264030],
            #          [-0.27670753,  0.06620564,  0.29072434, -0.31155765],
            #          [ 0.34123746, -0.05444612,  0.05001324, -1.46877074]],

            #         [[-0.64331555, -1.51103854, -1.26277697, -0.68024760],
            #          [ 2.59375715, -1.06665540,  0.96575671, -0.73330832],
            #          [-0.47064447, -0.23945692, -0.95150250, -1.07125998]]])
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            b_cond_2 = paddle.linalg.cond(b, p=2)
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            # Tensor(shape=[2], dtype=float32, place=Place(gpu:0), stop_gradient=True,
            #        [6.64228773, 3.89068866])
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    """

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    def mat_norm(input, porder=1.0, axis=None):
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        """
        NOTE:
            Calculate the matrix norm of a square matrix or batches of square matrices,
            when porder is in (1, -1, inf, -inf)
        """
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        if in_dygraph_mode():
            abs_out = _C_ops.abs(input)
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            sum_out = _C_ops.sum(abs_out, axis, None, False)
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            if porder == 1 or porder == np.inf:
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                return _C_ops.max(sum_out, [-1], False)
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            if porder == -1 or porder == -np.inf:
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                return _C_ops.min(sum_out, [-1], False)
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        else:
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            reduce_all = True if axis is None or axis == [] else False
            axis = axis if axis is not None and axis != [] else [0]
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            block = LayerHelper('norm', **locals())
            abs_out = block.create_variable_for_type_inference(
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                dtype=block.input_dtype()
            )
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            sum_out = block.create_variable_for_type_inference(
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                dtype=block.input_dtype()
            )
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            out = block.create_variable_for_type_inference(
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                dtype=block.input_dtype()
            )
            block.append_op(
                type='abs', inputs={'X': input}, outputs={'Out': abs_out}
            )
            block.append_op(
                type='reduce_sum',
                inputs={'X': abs_out},
                outputs={'Out': sum_out},
                attrs={
                    'dim': axis,
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                    'keep_dim': False,
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                    'reduce_all': reduce_all,
                },
            )
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            if porder == 1 or porder == np.inf:
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                block.append_op(
                    type='reduce_max',
                    inputs={'X': sum_out},
                    outputs={'Out': out},
                    attrs={
                        'dim': [-1],
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                        'keep_dim': False,
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                        'reduce_all': reduce_all,
                    },
                )
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            if porder == -1 or porder == -np.inf:
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                block.append_op(
                    type='reduce_min',
                    inputs={'X': sum_out},
                    outputs={'Out': out},
                    attrs={
                        'dim': [-1],
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                        'keep_dim': False,
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                        'reduce_all': reduce_all,
                    },
                )
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            return out
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    def fro_norm(input, porder=2, axis=[-1]):
        """
        NOTE:
            Calculate the frobenius norm of a square matrix or batches of square matrices.
        """
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        if in_dygraph_mode():
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            pow_out = _C_ops.pow(input, porder)
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            sum_out_1 = _C_ops.sum(pow_out, axis, None, False)
            sum_out_2 = _C_ops.sum(sum_out_1, axis, None, False)
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            return _C_ops.pow(sum_out_2, float(1.0 / porder))
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        else:
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            reduce_all = True if axis is None or axis == [] else False
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            block = LayerHelper('norm', **locals())
            pow_out = block.create_variable_for_type_inference(
                dtype=block.input_dtype()
            )
            sum_out_1 = block.create_variable_for_type_inference(
                dtype=block.input_dtype()
            )
            sum_out_2 = block.create_variable_for_type_inference(
                dtype=block.input_dtype()
            )
            out = block.create_variable_for_type_inference(
                dtype=block.input_dtype()
            )
            block.append_op(
                type='pow',
                inputs={'X': input},
                outputs={'Out': pow_out},
                attrs={'factor': porder},
            )
            block.append_op(
                type='reduce_sum',
                inputs={'X': pow_out},
                outputs={'Out': sum_out_1},
                attrs={
                    'dim': axis,
                    'keep_dim': False,
                    'reduce_all': reduce_all,
                },
            )
            block.append_op(
                type='reduce_sum',
                inputs={'X': sum_out_1},
                outputs={'Out': sum_out_2},
                attrs={
                    'dim': axis,
                    'keep_dim': False,
                    'reduce_all': reduce_all,
                },
            )
            block.append_op(
                type='pow',
                inputs={'X': sum_out_2},
                outputs={'Out': out},
                attrs={'factor': float(1.0 / porder)},
            )
            return out
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    def svd_norm(input, porder, axis=[-1]):
        """
        NOTE:
            Calculate the matrix norm, which is related to singular values, of a matrix
            or batches of matrices, including nuclear norm, 2-norm and (-2)-norm.
        """
        u, s, vh = svd(input, full_matrices=False)

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        if in_dygraph_mode():
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            if porder == "nuc":
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                return _C_ops.sum(s, axis, None, False)
            max_out = _C_ops.max(s, axis, False)
            min_out = _C_ops.min(s, axis, False)
            if porder == 2:
                return _C_ops.divide(max_out, min_out)
            if porder == -2:
                return _C_ops.divide(min_out, max_out)
        else:
            reduce_all = True if axis is None or axis == [] else False
            block = LayerHelper('norm', **locals())
            out = block.create_variable_for_type_inference(
                dtype=block.input_dtype()
            )
            if porder == "nuc":
                block.append_op(
                    type='reduce_sum',
                    inputs={'X': s},
                    outputs={'Out': out},
                    attrs={
                        'dim': axis,
                        'keep_dim': False,
                        'reduce_all': reduce_all,
                    },
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                )
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                return out
            max_out = block.create_variable_for_type_inference(
                dtype=block.input_dtype()
            )
            min_out = block.create_variable_for_type_inference(
                dtype=block.input_dtype()
            )
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            block.append_op(
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                type='reduce_max',
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                inputs={'X': s},
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                outputs={'Out': max_out},
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                attrs={
                    'dim': axis,
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                    'keep_dim': False,
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                    'reduce_all': reduce_all,
                },
            )
            block.append_op(
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                type='reduce_min',
                inputs={'X': s},
                outputs={'Out': min_out},
                attrs={
                    'dim': axis,
                    'keep_dim': False,
                    'reduce_all': reduce_all,
                },
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            )
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            if porder == 2:
                block.append_op(
                    type='elementwise_div',
                    inputs={'X': max_out, 'Y': min_out},
                    outputs={'Out': out},
                    attrs={'aixs': axis, 'use_mkldnn': False},
                )
                return out
            if porder == -2:
                block.append_op(
                    type='elementwise_div',
                    inputs={'X': min_out, 'Y': max_out},
                    outputs={'Out': out},
                    attrs={'aixs': axis, 'use_mkldnn': False},
                )
                return out
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    def empty_tensor(input, shape):
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        if in_dygraph_mode():
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            return input.reshape(shape)
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        raise ValueError(
            "only support x is nonempty tensor in static graph mode"
        )
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    x_shape = list(x.shape)
    if not len(x_shape) >= 2:
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        raise ValueError(
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            "input should be a matrix or batches of matrices, "
            + "but the dimention of received input is {}".format(len(x_shape))
        )
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    if p is None:
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        p = 2
    x_size = 0 if (0 in x_shape) else 1
    if p in ("fro", "nuc", 1, -1, np.inf, -np.inf):
        if x_shape[len(x_shape) - 1] == x_shape[len(x_shape) - 2]:
            if x_size == 0:
                return empty_tensor(x, x_shape[:-2])
            x_inv = x.inverse()
            if p == "fro":
                return fro_norm(x) * fro_norm(x_inv)
            if p == "nuc":
                return svd_norm(x, p) * svd_norm(x_inv, p)
            if p in (1, -1):
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                return mat_norm(x, porder=p, axis=[-2]) * mat_norm(
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                    x_inv, porder=p, axis=[-2]
                )
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            if p in (np.inf, -np.inf):
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                return mat_norm(x, porder=p, axis=[-1]) * mat_norm(
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                    x_inv, porder=p, axis=[-1]
                )
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        else:
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            raise ValueError(
                "only support p is {} when input is a ".format(p)
                + "square matrix or batches of square matrices"
            )
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    elif p in (2, -2):
        if x_size == 0:
            return empty_tensor(x, x_shape[:-2])
        return svd_norm(x, porder=p)
    else:
        raise ValueError(
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            "unsupported {} for p, only supporting ('fro', 'nuc', ".format(p)
            + "1, -1, 2, -2, inf, -inf) or none"
        )
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def dot(x, y, name=None):
    """
    This operator calculates inner product for vectors.
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    Note:
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       Support 1-d and 2-d Tensor. When it is 2d, the first dimension of this matrix
       is the batch dimension, which means that the vectors of multiple batches are dotted.
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    Parameters:
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        x(Tensor): 1-D or 2-D ``Tensor``. Its dtype should be ``float32``, ``float64``, ``int32``, ``int64``
        y(Tensor): 1-D or 2-D ``Tensor``. Its dtype soulde be ``float32``, ``float64``, ``int32``, ``int64``
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        name(str, optional): Name of the output. Default is None. It's used to print debug info for developers. Details: :ref:`api_guide_Name`

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    Returns:
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        Tensor: the calculated result Tensor.
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    Examples:

    .. code-block:: python

        import paddle
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        # 1-D Tensor * 1-D Tensor
        x = paddle.to_tensor([1, 2, 3])
        y = paddle.to_tensor([4, 5, 6])
        z = paddle.dot(x, y)
        print(z)  # [32]

        # 2-D Tensor * 2-D Tensor
        x = paddle.to_tensor([[1, 2, 3], [2, 4, 6]])
        y = paddle.to_tensor([[4, 5, 6], [4, 5, 6]])
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        z = paddle.dot(x, y)
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        print(z)  # [[32], [64]]
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    """
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    if in_dygraph_mode():
        return _C_ops.dot(x, y)
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    else:
        op_type = 'dot'
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        assert x is not None, 'x cannot be None in {}'.format(op_type)
        assert y is not None, 'y cannot be None in {}'.format(op_type)
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        check_variable_and_dtype(
            x, 'x', ['float32', 'float64', 'int32', 'int64'], op_type
        )
        check_variable_and_dtype(
            y, 'y', ['float32', 'float64', 'int32', 'int64'], op_type
        )
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        helper = LayerHelper(op_type, **locals())
        if name is None:
            out = helper.create_variable_for_type_inference(dtype=x.dtype)
        else:
            out = helper.create_variable(
                name=name, dtype=x.dtype, persistable=False
            )
        helper.append_op(
            type="dot", inputs={'X': x, 'Y': y}, attrs={}, outputs={"Out": out}
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        )
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        return out
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def cov(x, rowvar=True, ddof=True, fweights=None, aweights=None, name=None):
    """
    Estimate the covariance matrix of the input variables, given data and weights.

    A covariance matrix is a square matrix, indicate the covariance of each pair variables in the input matrix.
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    For example, for an N-dimensional samples X=[x1,x2,…xN]T, then the covariance matrix
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    element Cij is the covariance of xi and xj. The element Cii is the variance of xi itself.

    Parameters:
        x(Tensor): A N-D(N<=2) Tensor containing multiple variables and observations. By default, each row of x represents a variable. Also see rowvar below.
        rowvar(Bool, optional): If rowvar is True (default), then each row represents a variable, with observations in the columns. Default: True
        ddof(Bool, optional): If ddof=True will return the unbiased estimate, and ddof=False will return the simple average. Default: True
        fweights(Tensor, optional): 1-D Tensor of integer frequency weights; The number of times each observation vector should be repeated. Default: None
        aweights(Tensor, optional): 1-D Tensor of observation vector weights. How important of the observation vector, larger data means this element is more important. Default: None
        name(str, optional): Name of the output. Default is None. It's used to print debug info for developers. Details: :ref:`api_guide_Name`

    Returns:
        Tensor: The covariance matrix Tensor of the variables.

    Examples:

    .. code-block:: python

        import paddle

        xt = paddle.rand((3,4))
        paddle.linalg.cov(xt)

        '''
        Tensor(shape=[3, 3], dtype=float64, place=CUDAPlace(0), stop_gradient=True,
            [[0.07918842, 0.06127326, 0.01493049],
                [0.06127326, 0.06166256, 0.00302668],
                [0.01493049, 0.00302668, 0.01632146]])
        '''
    """
    op_type = 'cov'
    if len(x.shape) > 2 or len(x.shape) < 1:
        raise ValueError(
            "Input(x) only support N-D (1<=N<=2) tensor in cov, but received "
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            "length of Input(input) is %s." % len(x.shape)
        )
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    check_variable_and_dtype(x, 'dtype', ['float32', 'float64'], 'cov')
    nx = x
    if len(x.shape) == 1:
        nx = x.reshape((1, -1))
    if not rowvar and nx.shape[0] != 1:
        nx = nx.t()
    w = None
    observation_num = nx.shape[1]
    if fweights is not None:
        w = fweights.astype(nx.dtype)
        if len(w.shape) > 1:
            raise ValueError(
                "Input(fweights) only support N-D (N<=1) tensor in cov, but received "
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                "shape of Input(input) is %s." % len(fweights.shape)
            )
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        if fweights.shape[0] != observation_num:
            raise ValueError(
                "The number of Input(fweights) should equal to x's dim[1]: {}, but received "
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                "size of Input(fweights) is {}.".format(
                    observation_num, fweights.shape[0]
                )
            )
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        if fweights.min() < 0:
            raise ValueError(
                "The value of Input(fweights) cannot be negtive, but received "
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                "min of Input(fweights) is {}.".format(fweights.min())
            )
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        if not paddle.all(fweights == paddle.round(fweights.astype('float64'))):
            raise ValueError("Input(fweights) must be integer ")

    if aweights is not None:
        aw = aweights.astype(nx.dtype)
        if len(aw.shape) > 1:
            raise ValueError(
                "Input(aweights) only support N-D (N<=1) tensor in cov, but received "
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                "length of Input(input) is %s." % len(aweights.shape)
            )
        check_variable_and_dtype(
            aweights, 'dtype', ['float32', 'float64'], 'cov'
        )
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        if aweights.shape[0] != observation_num:
            raise ValueError(
                "The number of Input(aweights) should equal to x's dim[1]: {}, but received "
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                "size of Input(aweights) is {}.".format(
                    observation_num, aweights.shape[0]
                )
            )
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        if aweights.min() < 0:
            raise ValueError(
                "The value of Input(aweights) cannot be negtive, but received "
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                "min of Input(aweights) is {}.".format(aweights.min())
            )
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        if w is not None:
            w = w * aw
        else:
            w = aw

    w_sum = paddle.to_tensor(observation_num, dtype=nx.dtype)
    if fweights is not None or aweights is not None:
        w_sum = w.sum()
        if w_sum.item() == 0:
            raise ValueError("The sum of weights is zero, can't be normalized.")

    if w is not None:
        nx_w = nx * w
        avg = (nx_w).sum(axis=1) / w_sum
    else:
        avg = nx.sum(axis=1) / w_sum
        nx_w = nx

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    if w is not None and aweights is not None and ddof:
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        norm_factor = w_sum - (w * aweights).sum() / w_sum
    else:
        norm_factor = w_sum - ddof
    if norm_factor <= 0:
        norm_factor = paddle.to_tensor(0, dtype=nx.dtype)
    nx = nx - avg.unsqueeze(1)
    xxt = paddle.mm(nx, nx_w.t().conj())
    cov = paddle.divide(xxt, norm_factor).squeeze()
    return cov


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def t(input, name=None):
    """
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    Transpose <=2-D tensor.
    0-D and 1-D tensors are returned as it is and 2-D tensor is equal to
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    the paddle.transpose function which perm dimensions set 0 and 1.
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    Args:
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        input (Tensor): The input Tensor. It is a N-D (N<=2) Tensor of data types float32, float64, int32, int64.
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        name(str, optional): The default value is None.  Normally there is no need for
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            user to set this property.  For more information, please refer to :ref:`api_guide_Name`
    Returns:
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        Tensor: A transposed n-D Tensor, with data type being float16, float32, float64, int32, int64.
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    Examples:
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        .. code-block:: python
           :name: code-example
             import paddle
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1272
             # Example 1 (0-D tensor)
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             x = paddle.to_tensor([0.79])
             paddle.t(x) # [0.79]
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1276
             # Example 2 (1-D tensor)
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             x = paddle.to_tensor([0.79, 0.84, 0.32])
             paddle.t(x) # [0.79000002, 0.83999997, 0.31999999]
             paddle.t(x).shape # [3]
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             # Example 3 (2-D tensor)
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             x = paddle.to_tensor([[0.79, 0.84, 0.32],
                                  [0.64, 0.14, 0.57]])
             x.shape # [2, 3]
             paddle.t(x)
             # [[0.79000002, 0.63999999],
             #  [0.83999997, 0.14000000],
             #  [0.31999999, 0.56999999]]
             paddle.t(x).shape # [3, 2]
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    """
    if len(input.shape) > 2:
        raise ValueError(
            "Input(input) only support N-D (N<=2) tensor, but received "
            "length of Input(input) is %s. Perhaps you can use paddle."
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            "tensor.transpose() instead." % len(input.shape)
        )
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    if in_dygraph_mode():
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        if len(input.shape) <= 1:
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            return input
        # 2-D tensor
        perm = [1, 0]
1303
        out = _C_ops.transpose(input, perm)
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        return out
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    else:
        check_variable_and_dtype(
            input,
            'input',
            ['float16', 'float32', 'float64', 'int32', 'int64'],
            'transpose',
        )
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        helper = LayerHelper('t', **locals())
        out = helper.create_variable_for_type_inference(input.dtype)
        input_shape = helper.create_variable_for_type_inference(input.dtype)
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        if len(input.shape) <= 1:
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            out = input
        else:
            helper.append_op(
                type='transpose2',
                inputs={'X': [input]},
                outputs={'Out': [out], 'XShape': [input_shape]},
                attrs={'axis': [1, 0]},
            )
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        return out

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def cross(x, y, axis=9, name=None):
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    """
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    Computes the cross product between two tensors along an axis.
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    Inputs must have the same shape, and the length of their axes should be equal to 3.
    If `axis` is not given, it defaults to the first axis found with the length 3.
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    Args:
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        x (Tensor): The first input tensor.
        y (Tensor): The second input tensor.
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        axis (int, optional): The axis along which to compute the cross product. It defaults to be 9 which indicates using the first axis found with the length 3.
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        name (str, optional): Name for the operation (optional, default is None). For more information, please refer to :ref:`api_guide_Name`.
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    Returns:
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        Tensor. A Tensor with same data type as `x`.
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    Examples:
        .. code-block:: python
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1347
            import paddle
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            x = paddle.to_tensor([[1.0, 1.0, 1.0],
                                  [2.0, 2.0, 2.0],
                                  [3.0, 3.0, 3.0]])
            y = paddle.to_tensor([[1.0, 1.0, 1.0],
                                  [1.0, 1.0, 1.0],
                                  [1.0, 1.0, 1.0]])
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            z1 = paddle.cross(x, y)
            # [[-1. -1. -1.]
            #  [ 2.  2.  2.]
            #  [-1. -1. -1.]]

            z2 = paddle.cross(x, y, axis=1)
            # [[0. 0. 0.]
            #  [0. 0. 0.]
            #  [0. 0. 0.]]
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    """
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    if in_dygraph_mode():
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        axis = K_DEFAULT_DIM if axis is None else axis
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        return _C_ops.cross(x, y, axis)
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    else:
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        helper = LayerHelper("cross", **locals())
        out = helper.create_variable_for_type_inference(x.dtype)
        attrs = dict()
        attrs['dim'] = axis
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        helper.append_op(
            type='cross',
            inputs={'X': x, 'Y': y},
            outputs={'Out': out},
            attrs=attrs,
        )
        return out
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def cholesky(x, upper=False, name=None):
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    r"""
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    Computes the Cholesky decomposition of one symmetric positive-definite
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    matrix or batches of symmetric positive-definite matrice.

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    If `upper` is `True`, the decomposition has the form :math:`A = U^{T}U` ,
    and the returned matrix :math:`U` is upper-triangular. Otherwise, the
    decomposition has the form  :math:`A = LL^{T}` , and the returned matrix
    :math:`L` is lower-triangular.

    Args:
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        x (Tensor): The input tensor. Its shape should be `[*, M, M]`,
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            where * is zero or more batch dimensions, and matrices on the
            inner-most 2 dimensions all should be symmetric positive-definite.
            Its data type should be float32 or float64.
        upper (bool): The flag indicating whether to return upper or lower
            triangular matrices. Default: False.
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        name (str, optional): Name for the operation (optional, default is None).
            For more information, please refer to :ref:`api_guide_Name`.
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    Returns:
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        Tensor, A Tensor with same shape and data type as `x`. It represents
        triangular matrices generated by Cholesky decomposition.
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    Examples:
        .. code-block:: python

            import paddle

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            a = paddle.rand([3, 3], dtype="float32")
            a_t = paddle.transpose(a, [1, 0])
            x = paddle.matmul(a, a_t) + 1e-03

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            out = paddle.linalg.cholesky(x, upper=False)
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            print(out)
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    """
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    if in_dygraph_mode():
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        return _C_ops.cholesky(x, upper)
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    else:
        check_variable_and_dtype(x, 'dtype', ['float32', 'float64'], 'cholesky')
        check_type(upper, 'upper', bool, 'cholesky')
        helper = LayerHelper('cholesky', **locals())
        out = helper.create_variable_for_type_inference(dtype=x.dtype)
        helper.append_op(
            type='cholesky',
            inputs={'X': [x]},
            outputs={'Out': out},
            attrs={'upper': upper},
        )
        return out
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def matrix_rank(x, tol=None, hermitian=False, name=None):
    r"""
    Computes the rank of a matrix.

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    The rank of a matrix is the number of singular values that are greater than the specified `tol` threshold when hermitian=False,
1441
    or the number of eigenvalues in absolute value that are greater than the specified `tol` threshold when hermitian=True.
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    Args:
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        x (Tensor): The input tensor. Its shape should be `[..., m, n]`, where `...` is zero or more batch dimensions. If `x` is a batch
            of matrices then the output has the same batch dimensions. The data type of `x` should be float32 or float64.
        tol (float,Tensor,optional): the tolerance value. Default: None. If `tol` is not specified, and `sigma` is the largest
            singular value (or eigenvalues in absolute value), and `eps` is the epsilon value for the dtype of `x`, then `tol` is computed
1448
            with formula `tol=sigma * max(m,n) * eps`. Note that if `x` is a batch of matrices, `tol` is computed this way for every batch.
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        hermitian (bool,optional): indicates whether `x` is Hermitian. Default: False. When hermitian=True, `x` is assumed to be Hermitian,
            enabling a more efficient method for finding eigenvalues, but `x` is not checked inside the function. Instead, We just use
1451
            the lower triangular of the matrix to compute.
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        name (str, optional): Name for the operation (optional, default is None). For more information, please refer to :ref:`api_guide_Name`.

    Returns:
        Tensor: Rank of tensor x.
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    Examples:
        .. code-block:: python

            import paddle

            a = paddle.eye(10)
            b = paddle.linalg.matrix_rank(a)
            print(b)
            # b = [10]

            c = paddle.ones(shape=[3, 4, 5, 5])
            d = paddle.linalg.matrix_rank(c, tol=0.01, hermitian=True)
            print(d)
            # d = [[1, 1, 1, 1],
            #      [1, 1, 1, 1],
            #      [1, 1, 1, 1]]
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1474
    """
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    if in_dygraph_mode():
        if isinstance(tol, Variable):
            if tol.dtype != x.dtype:
                tol_tensor = cast(tol, x.dtype)
            else:
                tol_tensor = tol
            use_default_tol = False
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            return _C_ops.matrix_rank_tol(
                x, tol_tensor, use_default_tol, hermitian
            )
1485

1486 1487 1488 1489 1490 1491
        if tol is None:
            tol_attr = 0.0
            use_default_tol = True
        else:
            tol_attr = float(tol)
            use_default_tol = False
1492
        return _C_ops.matrix_rank(x, tol_attr, hermitian, use_default_tol)
1493 1494 1495 1496 1497
    else:
        inputs = {}
        attrs = {}
        check_variable_and_dtype(x, 'x', ['float32', 'float64'], 'matrix_rank')
        inputs['X'] = x
1498
        if tol is None:
1499
            attrs['use_default_tol'] = True
1500
        elif isinstance(tol, Variable):
1501
            attrs['use_default_tol'] = False
1502
            if tol.dtype != x.dtype:
1503
                inputs['TolTensor'] = cast(tol, x.dtype)
1504
            else:
1505
                inputs['TolTensor'] = tol
1506
        else:
1507 1508 1509 1510 1511 1512 1513 1514 1515 1516 1517 1518
            check_type(tol, 'tol', float, 'matrix_rank')
            attrs['use_default_tol'] = False
            attrs['tol'] = tol
        check_type(hermitian, 'hermitian', bool, 'matrix_rank')
        attrs['hermitian'] = hermitian

        helper = LayerHelper('matrix_rank', **locals())
        out = helper.create_variable_for_type_inference(dtype='int32')
        helper.append_op(
            type='matrix_rank', inputs=inputs, outputs={'Out': out}, attrs=attrs
        )
        return out
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1521 1522 1523 1524 1525 1526 1527 1528 1529
def bmm(x, y, name=None):
    """
    Applies batched matrix multiplication to two tensors.

    Both of the two input tensors must be three-dementional and share the same batch size.

    if x is a (b, m, k) tensor, y is a (b, k, n) tensor, the output will be a (b, m, n) tensor.

    Args:
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        x (Tensor): The input Tensor.
        y (Tensor): The input Tensor.
1532 1533 1534 1535
        name(str|None): A name for this layer(optional). If set None, the layer
            will be named automatically.

    Returns:
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        Tensor: The product Tensor.
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    Examples:
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        .. code-block:: python

            import paddle
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            # In imperative mode:
            # size x: (2, 2, 3) and y: (2, 3, 2)
            x = paddle.to_tensor([[[1.0, 1.0, 1.0],
                                [2.0, 2.0, 2.0]],
                                [[3.0, 3.0, 3.0],
                                [4.0, 4.0, 4.0]]])
            y = paddle.to_tensor([[[1.0, 1.0],[2.0, 2.0],[3.0, 3.0]],
                                [[4.0, 4.0],[5.0, 5.0],[6.0, 6.0]]])
            out = paddle.bmm(x, y)
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            # Tensor(shape=[2, 2, 2], dtype=float32, place=Place(cpu), stop_gradient=True,
            #        [[[6. , 6. ],
            #          [12., 12.]],

            #         [[45., 45.],
            #          [60., 60.]]])
1558

1559
    """
1560
    if in_dygraph_mode():
1561
        return _C_ops.bmm(x, y)
1562
    else:
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        x_shape = x.shape
        y_shape = y.shape
        if not len(x_shape) == len(y_shape) == 3:
            raise ValueError(
                "x and y should be 3-dimensional. But received x's dimention: {}, y's dimention: {}".format(
                    x_shape, y_shape
                )
            )
        if x_shape[2] != y_shape[1]:
            raise ValueError(
                "x's width must be equal with y's height. But received x's shape: {}, y's shape: {}".format(
                    x_shape, y_shape
                )
            )
        if x_shape[0] != y_shape[0]:
            raise ValueError(
                "x's batch (shape[0]) must be equal with y's batch (shape[0]). But received x's shape: {}, y's shape: {}".format(
                    x_shape, y_shape
                )
            )
1583 1584 1585 1586 1587 1588
        helper = LayerHelper('bmm', **locals())
        out = helper.create_variable_for_type_inference(dtype=x.dtype)
        helper.append_op(
            type='bmm', inputs={'X': x, 'Y': y}, outputs={'Out': out}
        )
        return out
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1591
def histogram(input, bins=100, min=0, max=0, name=None):
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    """
1593
    Computes the histogram of a tensor. The elements are sorted into equal width bins between min and max.
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    If min and max are both zero, the minimum and maximum values of the data are used.

    Args:
1597
        input (Tensor): A Tensor(or LoDTensor) with shape :math:`[N_1, N_2,..., N_k]` . The data type of the input Tensor
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            should be float32, float64, int32, int64.
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        bins (int, optional): number of histogram bins.
        min (int, optional): lower end of the range (inclusive).
        max (int, optional): upper end of the range (inclusive).
        name (str, optional): For details, please refer to :ref:`api_guide_Name`. Generally, no setting is required. Default: None.
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    Returns:
1605
        Tensor: data type is int64, shape is (nbins,).
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1607
    Examples:
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        .. code-block:: python
1609

Q
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1610
            import paddle
1611

1612
            inputs = paddle.to_tensor([1, 2, 1])
1613 1614
            result = paddle.histogram(inputs, bins=4, min=0, max=3)
            print(result) # [0, 2, 1, 0]
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    """
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    if in_dygraph_mode():
1617
        return _C_ops.histogram(input, bins, min, max)
1618 1619 1620 1621
    else:
        helper = LayerHelper('histogram', **locals())
        check_variable_and_dtype(
            input, 'X', ['int32', 'int64', 'float32', 'float64'], 'histogram'
1622
        )
1623 1624 1625 1626 1627 1628 1629 1630
        out = helper.create_variable_for_type_inference(VarDesc.VarType.INT64)
        helper.append_op(
            type='histogram',
            inputs={'X': input},
            outputs={'Out': out},
            attrs={'bins': bins, 'min': min, 'max': max},
        )
        return out
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1631 1632 1633 1634


def bincount(x, weights=None, minlength=0, name=None):
    """
1635
    Computes frequency of each value in the input tensor.
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1636 1637 1638 1639 1640 1641 1642 1643 1644 1645 1646 1647 1648 1649 1650 1651 1652 1653 1654 1655 1656 1657 1658 1659 1660 1661 1662

    Args:
        x (Tensor): A Tensor with non-negative integer. Should be 1-D tensor.
        weights (Tensor, optional): Weight for each value in the input tensor. Should have the same shape as input. Default is None.
        minlength (int, optional): Minimum number of bins. Should be non-negative integer. Default is 0.
        name(str, optional): The default value is None.  Normally there is no need for user to set this
            property.  For more information, please refer to :ref:`api_guide_Name`.

    Returns:
        Tensor: The tensor of frequency.

    Examples:
        .. code-block:: python

            import paddle

            x = paddle.to_tensor([1, 2, 1, 4, 5])
            result1 = paddle.bincount(x)
            print(result1) # [0, 2, 1, 0, 1, 1]

            w = paddle.to_tensor([2.1, 0.4, 0.1, 0.5, 0.5])
            result2 = paddle.bincount(x, weights=w)
            print(result2) # [0., 2.19999981, 0.40000001, 0., 0.50000000, 0.50000000]
    """
    if x.dtype not in [paddle.int32, paddle.int64]:
        raise TypeError("Elements in Input(x) should all be integers")

1663 1664
    if in_dygraph_mode():
        return _C_ops.bincount(x, weights, minlength)
1665 1666
    else:
        helper = LayerHelper('bincount', **locals())
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1668
        check_variable_and_dtype(x, 'X', ['int32', 'int64'], 'bincount')
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1670 1671 1672 1673 1674 1675 1676 1677 1678 1679 1680 1681 1682 1683 1684
        if weights is not None:
            check_variable_and_dtype(
                weights,
                'Weights',
                ['int32', 'int64', 'float32', 'float64'],
                'bincount',
            )
            out = helper.create_variable_for_type_inference(dtype=weights.dtype)
        else:
            out = helper.create_variable_for_type_inference(dtype=x.dtype)
        helper.append_op(
            type='bincount',
            inputs={'X': x, 'Weights': weights},
            outputs={'Out': out},
            attrs={'minlength': minlength},
1685
        )
1686
        return out
1687 1688 1689 1690 1691 1692 1693


def mv(x, vec, name=None):
    """
    Performs a matrix-vector product of the matrix x and the vector vec.

    Args:
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        x (Tensor): A tensor with shape :math:`[M, N]` , The data type of the input Tensor x
1695
            should be one of float32, float64.
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        vec (Tensor): A tensor with shape :math:`[N]` , The data type of the input Tensor x
1697 1698 1699 1700 1701 1702 1703 1704 1705 1706 1707 1708 1709 1710 1711
            should be one of float32, float64.
        name(str, optional): The default value is None.  Normally there is no need for user to set this
            property.  For more information, please refer to :ref:`api_guide_Name`.

    Returns:
        Tensor: The tensor which is producted by x and vec.

    Examples:
        .. code-block:: python

            # x: [M, N], vec: [N]
            # paddle.mv(x, vec)  # out: [M]

            import paddle

1712 1713
            x = paddle.to_tensor([[2, 1, 3], [3, 0, 1]]).astype("float64")
            vec = paddle.to_tensor([3, 5, 1]).astype("float64")
1714
            out = paddle.mv(x, vec)
1715 1716 1717
            print(out)
            # Tensor(shape=[2], dtype=float64, place=Place(cpu), stop_gradient=True,
            #        [14., 10.])
1718
    """
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    if in_dygraph_mode():
1720
        return _C_ops.mv(x, vec)
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1721
    else:
1722

1723 1724 1725 1726 1727 1728 1729 1730 1731 1732 1733 1734
        def __check_input(x, vec):
            var_names = {'x': x, 'vec': vec}
            for name, val in var_names.items():
                check_variable_and_dtype(
                    val, name, ['float32', 'float64'], 'mv'
                )
            x_shape = list(x.shape)
            vec_shape = list(vec.shape)
            if len(x_shape) != 2:
                raise ValueError(
                    "x should be 2-dimensional. But received x's dimention: {}".format(
                        x_shape
1735
                    )
1736 1737 1738 1739 1740
                )
            if len(vec_shape) != 1:
                raise ValueError(
                    "vec should be 1-dimensional. But received vec's dimention: {}".format(
                        vec_shape
1741
                    )
1742
                )
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1743

1744
        __check_input(x, vec)
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1745

1746 1747 1748 1749 1750 1751
        helper = LayerHelper('mv', **locals())
        out = helper.create_variable_for_type_inference(dtype=x.dtype)
        helper.append_op(
            type='mv', inputs={'X': x, 'Vec': vec}, outputs={'Out': out}
        )
        return out
1752 1753


1754
def det(x, name=None):
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    """
1756

H
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1757
    Calculates determinant value of a square matrix or batches of square matrices.
1758

H
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1759
    Args:
1760
        x (Tensor): the input matrix of size `(n, n)` or the
1761 1762
            batch of matrices of size `(*, n, n)` where `*` is one or more
            batch dimensions.
1763 1764
        name(str, optional): Name of the output. Default is None. It's used
            to print debug info for developers. Details: :ref:`api_guide_Name`
1765

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    Returns:
1767
        Tensor, the determinant value of a square matrix or batches of square matrices.
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1769
    Examples:
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1770 1771
        .. code-block:: python

1772
            import paddle
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1773

1774
            x =  paddle.randn([3,3,3])
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1775

1776
            A = paddle.linalg.det(x)
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1777

1778
            print(A)
1779

1780
            # [ 0.02547996,  2.52317095, -6.15900707])
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1781

1782

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1783
    """
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    if in_dygraph_mode():
1785
        return _C_ops.det(x)
1786 1787
    else:
        check_dtype(x.dtype, 'Input', ['float32', 'float64'], 'det')
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1789 1790 1791 1792 1793
        input_shape = list(x.shape)
        assert len(input_shape) >= 2, (
            "The x must be at least 2-dimensional, "
            "but received Input x's dimensional: %s.\n" % len(input_shape)
        )
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1795 1796 1797 1798 1799 1800 1801 1802
        assert (
            input_shape[-1] == input_shape[-2]
        ), "Expect squared input," "but received %s by %s matrix.\n" % (
            input_shape[-2],
            input_shape[-1],
        )
        helper = LayerHelper('determinant', **locals())
        out = helper.create_variable_for_type_inference(dtype=x.dtype)
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1804 1805 1806 1807
        helper.append_op(
            type='determinant', inputs={'Input': [x]}, outputs={'Out': [out]}
        )
        return out
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1808 1809


1810
def slogdet(x, name=None):
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1811
    """
1812

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1813
    Calculates the sign and natural logarithm of the absolute value of a square matrix's or batches square matrices' determinant.
1814
    The determinant can be computed with ``sign * exp`` (logabsdet)
1815

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1816 1817 1818
    Supports input of float, double

    Note that for matrices that have zero determinant, this returns ``(0, -inf)``
1819

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1820 1821 1822 1823 1824
    Args:
        x (Tensor): the batch of matrices of size :math:`(*, n, n)`
            where math:`*` is one or more batch dimensions.

    Returns:
1825
        y (Tensor), A tensor containing the sign of the determinant and the natural logarithm
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        of the absolute value of determinant, respectively.

1828
    Examples:
1829
        .. code-block:: python
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1830

1831
            import paddle
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1832

1833
            x =  paddle.randn([3,3,3])
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1834

1835
            A = paddle.linalg.slogdet(x)
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1836

1837
            print(A)
1838

1839 1840
            # [[ 1.        ,  1.        , -1.        ],
            # [-0.98610914, -0.43010661, -0.10872950]])
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1841 1842

    """
1843
    if in_dygraph_mode():
1844
        return _C_ops.slogdet(x)
1845 1846
    else:
        check_dtype(x.dtype, 'Input', ['float32', 'float64'], 'slogdet')
1847

1848 1849 1850 1851 1852
        input_shape = list(x.shape)
        assert len(input_shape) >= 2, (
            "The x must be at least 2-dimensional, "
            "but received Input x's dimensional: %s.\n" % len(input_shape)
        )
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1854 1855 1856 1857 1858 1859 1860 1861
        assert (
            input_shape[-1] == input_shape[-2]
        ), "Expect squared input," "but received %s by %s matrix.\n" % (
            input_shape[-2],
            input_shape[-1],
        )
        helper = LayerHelper('slogdeterminant', **locals())
        out = helper.create_variable_for_type_inference(dtype=x.dtype)
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1863 1864 1865 1866 1867 1868
        helper.append_op(
            type='slogdeterminant',
            inputs={'Input': [x]},
            outputs={'Out': [out]},
        )
        return out
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1869 1870


1871 1872
def svd(x, full_matrices=False, name=None):
    r"""
1873 1874 1875 1876 1877
    Computes the singular value decomposition of one matrix or a batch of regular matrices.

    Let :math:`X` be the input matrix or a batch of input matrices, the output should satisfies:

    .. math::
1878 1879
        X = U * diag(S) * VT

1880 1881
    Args:
        x (Tensor): The input tensor. Its shape should be `[..., N, M]`,
1882
            where `...` is zero or more batch dimensions. N and M can be arbitraty
1883 1884
            positive number. Note that if x is sigular matrices, the grad is numerical
            instable. The data type of x should be float32 or float64.
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        full_matrices (bool, optional): A flag to control the behavor of svd.
1886
            If full_matrices = True, svd op will compute full U and V matrics,
1887
            which means shape of U is `[..., N, N]`, shape of V is `[..., M, M]`. K = min(M, N).
1888
            If full_matrices = False, svd op will use a economic method to store U and V.
1889
            which means shape of U is `[..., N, K]`, shape of V is `[..., M, K]`. K = min(M, N).
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            Default value is False.
1891
        name (str, optional): Name for the operation (optional, default is None).
1892
            For more information, please refer to :ref:`api_guide_Name`.
1893 1894

    Returns:
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1895 1896 1897 1898 1899
        - U (Tensor), is the singular value decomposition result U.
        - S (Tensor), is the singular value decomposition result S.
        - VH (Tensor), VH is the conjugate transpose of V, which is the singular value decomposition result V.

        Tuple of 3 tensors(U, S, VH): VH is the conjugate transpose of V. S is the singlar value vectors of matrics with shape `[..., K]`
1900

1901 1902 1903 1904
    Examples:
        .. code-block:: python

            import paddle
1905 1906 1907

            x = paddle.to_tensor([[1.0, 2.0], [1.0, 3.0], [4.0, 6.0]]).astype('float64')
            x = x.reshape([3, 2])
1908
            u, s, vh = paddle.linalg.svd(x)
1909 1910 1911 1912 1913
            print (u)
            #U = [[ 0.27364809, -0.21695147  ],
            #      [ 0.37892198, -0.87112408 ],
            #      [ 0.8840446 ,  0.44053933 ]]

1914
            print (s)
1915
            #S = [8.14753743, 0.78589688]
1916
            print (vh)
1917 1918
            #VT= [[ 0.51411221,  0.85772294],
            #     [ 0.85772294, -0.51411221]]
1919

1920
            # one can verify : U * S * VT == X
1921
            #                  U * UH == I
1922
            #                  V * VH == I
1923
    """
1924
    if in_dygraph_mode():
1925
        return _C_ops.svd(x, full_matrices)
1926 1927 1928 1929 1930 1931 1932 1933 1934 1935 1936 1937 1938 1939 1940 1941
    else:
        check_variable_and_dtype(x, 'dtype', ['float32', 'float64'], 'svd')
        check_type(full_matrices, 'full_matrices', bool, 'svd')
        helper = LayerHelper('svd', **locals())
        u = helper.create_variable_for_type_inference(dtype=x.dtype)
        vh = helper.create_variable_for_type_inference(dtype=x.dtype)
        s = helper.create_variable_for_type_inference(dtype=x.dtype)
        attrs = dict()
        attrs['full_matrices'] = full_matrices
        helper.append_op(
            type='svd',
            inputs={'X': [x]},
            outputs={'U': u, 'VH': vh, 'S': s},
            attrs=attrs,
        )
        return u, s, vh
1942 1943


1944 1945
def matrix_power(x, n, name=None):
    r"""
1946

1947
    Computes the n-th power of a square matrix or a batch of square matrices.
1948

1949 1950 1951 1952 1953
    Let :math:`X` be a sqaure matrix or a batch of square matrices, :math:`n` be
    an exponent, the equation should be:

    .. math::
        Out = X ^ {n}
1954

1955 1956
    Specifically,

1957
    - If `n > 0`, it returns the matrix or a batch of matrices raised to the power of `n`.
1958

1959 1960
    - If `n = 0`, it returns the identity matrix or a batch of identity matrices.

1961
    - If `n < 0`, it returns the inverse of each matrix (if invertible) raised to the power of `abs(n)`.
1962 1963 1964 1965 1966 1967

    Args:
        x (Tensor): A square matrix or a batch of square matrices to be raised
            to power `n`. Its shape should be `[*, M, M]`, where `*` is zero or
            more batch dimensions. Its data type should be float32 or float64.
        n (int): The exponent. It can be any positive, negative integer or zero.
1968
        name (str, optional): Name for the operation (optional, default is None).
1969 1970 1971
            For more information, please refer to :ref:`api_guide_Name`.

    Returns:
1972 1973
        - Tensor, The n-th power of the matrix (or the batch of matrices) `x`. Its
          data type should be the same as that of `x`.
1974 1975 1976 1977 1978 1979 1980 1981 1982

    Examples:
        .. code-block:: python

            import paddle

            x = paddle.to_tensor([[1, 2, 3],
                                  [1, 4, 9],
                                  [1, 8, 27]], dtype='float64')
1983
            print(paddle.linalg.matrix_power(x, 2))
1984 1985 1986 1987
            # [[6.  , 34. , 102.],
            #  [14. , 90. , 282.],
            #  [36. , 250., 804.]]

1988
            print(paddle.linalg.matrix_power(x, 0))
1989 1990 1991 1992
            # [[1., 0., 0.],
            #  [0., 1., 0.],
            #  [0., 0., 1.]]

1993
            print(paddle.linalg.matrix_power(x, -2))
1994 1995 1996 1997
            # [[ 12.91666667, -12.75000000,  2.83333333 ],
            #  [-7.66666667 ,  8.         , -1.83333333 ],
            #  [ 1.80555556 , -1.91666667 ,  0.44444444 ]]
    """
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    if in_dygraph_mode():
1999
        return _C_ops.matrix_power(x, n)
2000 2001 2002 2003 2004 2005 2006 2007 2008 2009 2010 2011 2012 2013
    else:
        check_variable_and_dtype(
            x, 'dtype', ['float32', 'float64'], 'matrix_power'
        )
        check_type(n, 'n', int, 'matrix_power')
        helper = LayerHelper('matrix_power', **locals())
        out = helper.create_variable_for_type_inference(dtype=x.dtype)
        helper.append_op(
            type='matrix_power',
            inputs={'X': x},
            outputs={'Out': out},
            attrs={'n': n},
        )
        return out
2014 2015


2016 2017 2018 2019 2020 2021 2022
def qr(x, mode="reduced", name=None):
    r"""
    Computes the QR decomposition of one matrix or batches of matrice (backward is unsupported now).

    Args:
        x (Tensor): The input tensor. Its shape should be `[..., M, N]`,
            where ... is zero or more batch dimensions. M and N can be arbitrary
2023 2024
            positive number. The data type of x should be float32 or float64.
        mode (str, optional): A flag to control the behavior of qr, the default is "reduced".
2025
            Suppose x's shape is `[..., M, N]` and denoting `K = min(M, N)`:
2026
            If mode = "reduced", qr op will return reduced Q and R matrices,
2027
            which means Q's shape is `[..., M, K]` and R's shape is `[..., K, N]`.
2028
            If mode = "complete", qr op will return complete Q and R matrices,
2029 2030 2031 2032 2033
            which means Q's shape is `[..., M, M]` and R's shape is `[..., M, N]`.
            If mode = "r", qr op will only return reduced R matrix, which means
            R's shape is `[..., K, N]`.
        name (str, optional): Name for the operation (optional, default is None).
            For more information, please refer to :ref:`api_guide_Name`.
2034

2035
    Returns:
2036
        If mode = "reduced" or mode = "complete", qr will return a two tensor-tuple, which represents Q and R.
2037
        If mode = "r", qr will return a tensor which represents R.
2038 2039

    Examples:
2040 2041
        .. code-block:: python

2042
            import paddle
2043 2044 2045 2046 2047 2048 2049 2050 2051 2052 2053 2054

            x = paddle.to_tensor([[1.0, 2.0], [3.0, 4.0], [5.0, 6.0]]).astype('float64')
            q, r = paddle.linalg.qr(x)
            print (q)
            print (r)

            # Q = [[-0.16903085,  0.89708523],
            #      [-0.50709255,  0.27602622],
            #      [-0.84515425, -0.34503278]])

            # R = [[-5.91607978, -7.43735744],
            #      [ 0.        ,  0.82807867]])
2055 2056

            # one can verify : X = Q * R ;
2057
    """
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2058
    if in_dygraph_mode():
2059
        q, r = _C_ops.qr(x, mode)
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2060 2061 2062 2063
        if mode == "r":
            return r
        else:
            return q, r
2064 2065 2066 2067 2068 2069 2070 2071 2072 2073 2074
    else:
        check_variable_and_dtype(x, 'dtype', ['float32', 'float64'], 'qr')
        check_type(mode, 'mode', str, 'qr')
        helper = LayerHelper('qr', **locals())
        q = helper.create_variable_for_type_inference(dtype=x.dtype)
        r = helper.create_variable_for_type_inference(dtype=x.dtype)
        attrs = dict()
        attrs['mode'] = mode
        helper.append_op(
            type='qr', inputs={'X': [x]}, outputs={'Q': q, 'R': r}, attrs=attrs
        )
2075 2076 2077 2078 2079 2080
        if mode == "r":
            return r
        else:
            return q, r


2081 2082
def lu(x, pivot=True, get_infos=False, name=None):
    r"""
2083
    Computes the LU factorization of an N-D(N>=2) matrix x.
2084

2085
    Returns the LU factorization(inplace x) and Pivots. low triangular matrix L and
2086 2087 2088 2089
    upper triangular matrix U are combined to a single LU matrix.

    Pivoting is done if pivot is set to True.
    P mat can be get by pivots:
2090 2091 2092 2093 2094 2095

    .. code-block:: text
        ones = eye(rows) #eye matrix of rank rows
        for i in range(cols):
            swap(ones[i], ones[pivots[i]])
        return ones
2096 2097 2098 2099 2100 2101 2102 2103 2104 2105 2106

    Args:

        X (Tensor): the tensor to factor of N-dimensions(N>=2).

        pivot (bool, optional): controls whether pivoting is done. Default: True.

        get_infos (bool, optional): if set to True, returns an info IntTensor. Default: False.

        name (str, optional): Name for the operation (optional, default is None).
            For more information, please refer to :ref:`api_guide_Name`.
2107

2108
    Returns:
2109
        factorization (Tensor), LU matrix, the factorization of input X.
2110

2111 2112 2113
        pivots (IntTensor), the pivots of size(∗(N-2), min(m,n)). `pivots` stores all the
        intermediate transpositions of rows. The final permutation `perm` could be
        reconstructed by this, details refer to upper example.
2114

2115 2116 2117
        infos (IntTensor, optional), if `get_infos` is `True`, this is a tensor of size (∗(N-2))
        where non-zero values indicate whether factorization for the matrix or each minibatch
        has succeeded or failed.
2118

2119 2120

    Examples:
2121 2122
        .. code-block:: python

2123
            import paddle
2124 2125 2126 2127 2128 2129 2130 2131 2132 2133 2134 2135 2136 2137 2138

            x = paddle.to_tensor([[1.0, 2.0], [3.0, 4.0], [5.0, 6.0]]).astype('float64')
            lu,p,info = paddle.linalg.lu(x, get_infos=True)

            # >>> lu:
            # Tensor(shape=[3, 2], dtype=float64, place=CUDAPlace(0), stop_gradient=True,
            #    [[5.        , 6.        ],
            #        [0.20000000, 0.80000000],
            #        [0.60000000, 0.50000000]])
            # >>> p
            # Tensor(shape=[2], dtype=int32, place=CUDAPlace(0), stop_gradient=True,
            #    [3, 3])
            # >>> info
            # Tensor(shape=[], dtype=int32, place=CUDAPlace(0), stop_gradient=True,
            #    0)
2139

2140 2141 2142 2143 2144 2145
            P,L,U = paddle.linalg.lu_unpack(lu,p)

            # >>> P
            # (Tensor(shape=[3, 3], dtype=float64, place=CUDAPlace(0), stop_gradient=True,
            # [[0., 1., 0.],
            # [0., 0., 1.],
2146
            # [1., 0., 0.]]),
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            # >>> L
            # Tensor(shape=[3, 2], dtype=float64, place=CUDAPlace(0), stop_gradient=True,
            # [[1.        , 0.        ],
            # [0.20000000, 1.        ],
2151
            # [0.60000000, 0.50000000]]),
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            # >>> U
            # Tensor(shape=[2, 2], dtype=float64, place=CUDAPlace(0), stop_gradient=True,
            # [[5.        , 6.        ],
            # [0.        , 0.80000000]]))

2157 2158

            # one can verify : X = P @ L @ U ;
2159
    """
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    if in_dygraph_mode():
2162
        lu, p, info = _C_ops.lu(x, pivot)
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    else:
        check_variable_and_dtype(x, 'dtype', ['float32', 'float64'], 'lu')
        helper = LayerHelper('lu', **locals())
        lu = helper.create_variable_for_type_inference(dtype=x.dtype)
        p = helper.create_variable_for_type_inference(dtype='int')
        info = helper.create_variable_for_type_inference(dtype='int')
        attrs = dict()
        attrs['pivot'] = pivot
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        helper.append_op(
            type='lu',
            inputs={'X': x},
            outputs={'Out': lu, 'Pivots': p, 'Infos': info},
            attrs=attrs,
        )
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    if get_infos:
        return lu, p, info
    else:
        return lu, p


def lu_unpack(x, y, unpack_ludata=True, unpack_pivots=True, name=None):
    r"""
2185
    Unpack L U and P to single matrix tensor .
2186 2187 2188
    unpack L and U matrix from LU, unpack permutation matrix P from Pivtos .

    P mat can be get by pivots:
2189 2190 2191 2192 2193

    .. code-block:: text
        ones = eye(rows) #eye matrix of rank rows
        for i in range(cols):
            swap(ones[i], ones[pivots[i]])
2194 2195 2196 2197 2198 2199 2200 2201 2202 2203 2204 2205 2206


    Args:
        x (Tensor): The LU tensor get from paddle.linalg.lu, which is combined by L and U.

        y (Tensor): Pivots get from paddle.linalg.lu.

        unpack_ludata (bool,optional): whether to unpack L and U from x. Default: True.

        unpack_pivots (bool, optional): whether to unpack permutation matrix P from Pivtos. Default: True.

        name (str, optional): Name for the operation (optional, default is None).
            For more information, please refer to :ref:`api_guide_Name`.
2207

2208
    Returns:
2209
        P (Tensor), Permutation matrix P of lu factorization.
2210

2211
        L (Tensor), The lower triangular matrix tensor of lu factorization.
2212

2213
        U (Tensor), The upper triangular matrix tensor of lu factorization.
2214

2215 2216

    Examples:
2217 2218
        .. code-block:: python

2219
            import paddle
2220 2221 2222 2223 2224 2225 2226 2227 2228 2229 2230 2231 2232 2233 2234

            x = paddle.to_tensor([[1.0, 2.0], [3.0, 4.0], [5.0, 6.0]]).astype('float64')
            lu,p,info = paddle.linalg.lu(x, get_infos=True)

            # >>> lu:
            # Tensor(shape=[3, 2], dtype=float64, place=CUDAPlace(0), stop_gradient=True,
            #    [[5.        , 6.        ],
            #        [0.20000000, 0.80000000],
            #        [0.60000000, 0.50000000]])
            # >>> p
            # Tensor(shape=[2], dtype=int32, place=CUDAPlace(0), stop_gradient=True,
            #    [3, 3])
            # >>> info
            # Tensor(shape=[], dtype=int32, place=CUDAPlace(0), stop_gradient=True,
            #    0)
2235

2236 2237 2238 2239 2240 2241
            P,L,U = paddle.linalg.lu_unpack(lu,p)

            # >>> P
            # (Tensor(shape=[3, 3], dtype=float64, place=CUDAPlace(0), stop_gradient=True,
            # [[0., 1., 0.],
            # [0., 0., 1.],
2242
            # [1., 0., 0.]]),
2243 2244 2245 2246
            # >>> L
            # Tensor(shape=[3, 2], dtype=float64, place=CUDAPlace(0), stop_gradient=True,
            # [[1.        , 0.        ],
            # [0.20000000, 1.        ],
2247
            # [0.60000000, 0.50000000]]),
2248 2249 2250 2251 2252
            # >>> U
            # Tensor(shape=[2, 2], dtype=float64, place=CUDAPlace(0), stop_gradient=True,
            # [[5.        , 6.        ],
            # [0.        , 0.80000000]]))

2253
            # one can verify : X = P @ L @ U ;
2254 2255
    """

2256
    if in_dygraph_mode():
2257
        P, L, U = _C_ops.lu_unpack(x, y, unpack_ludata, unpack_pivots)
2258
        return P, L, U
2259 2260 2261
    else:
        check_variable_and_dtype(
            x, 'dtype', ['float32', 'float64'], 'lu_unpack'
2262
        )
2263 2264 2265 2266
        helper = LayerHelper('lu_unpack', **locals())
        p = helper.create_variable_for_type_inference(dtype=x.dtype)
        l = helper.create_variable_for_type_inference(dtype=x.dtype)
        u = helper.create_variable_for_type_inference(dtype=x.dtype)
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        attrs = dict()
        attrs['unpack_ludata'] = unpack_ludata
        attrs['unpack_pivots'] = unpack_pivots
        helper.append_op(
            type='lu_unpack',
            inputs={'X': x, 'Pivots': y},
            outputs={'Pmat': p, 'L': l, 'U': u},
            attrs=attrs,
        )
        return p, l, u
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def eig(x, name=None):
    """
2282
    Performs the eigenvalue decomposition of a square matrix or a batch of square matrices.
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2284 2285 2286 2287 2288 2289
    Note:
        - If the matrix is a Hermitian or a real symmetric matrix, please use :ref:`paddle.linalg.eigh` instead, which is much faster.
        - If only eigenvalues is needed, please use :ref:`paddle.linalg.eigvals` instead.
        - If the matrix is of any shape, please use :ref:`paddle.linalg.svd`.
        - This API is only supported on CPU device.
        - The output datatype is always complex for both real and complex input.
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    Args:
        x (Tensor): A tensor with shape math:`[*, N, N]`, The data type of the x should be one of ``float32``,
            ``float64``, ``compplex64`` or ``complex128``.
2294
        name (str, optional): The default value is `None`. Normally there is no need for user to set
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            this property. For more information, please refer to :ref:`api_guide_Name`.

    Returns:
        Eigenvalues(Tensors): A tensor with shape math:`[*, N]` refers to the eigen values.
        Eigenvectors(Tensors): A tensor with shape math:`[*, N, N]` refers to the eigen vectors.

    Examples:
        .. code-block:: python

            import paddle

            paddle.device.set_device("cpu")

2308
            x = paddle.to_tensor([[1.6707249, 7.2249975, 6.5045543],
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                               [9.956216,  8.749598,  6.066444 ],
2310
                               [4.4251957, 1.7983172, 0.370647 ]])
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            w, v = paddle.linalg.eig(x)
2312
            print(v)
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            # Tensor(shape=[3, 3], dtype=complex128, place=CPUPlace, stop_gradient=False,
            #       [[(-0.5061363550800655+0j) , (-0.7971760990842826+0j) ,
            #         (0.18518077798279986+0j)],
            #        [(-0.8308237755993192+0j) ,  (0.3463813401919749+0j) ,
            #         (-0.6837005269141947+0j) ],
            #        [(-0.23142567697893396+0j),  (0.4944999840400175+0j) ,
            #         (0.7058765252952796+0j) ]])

2321
            print(w)
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            # Tensor(shape=[3], dtype=complex128, place=CPUPlace, stop_gradient=False,
            #       [ (16.50471283351188+0j)  , (-5.5034820550763515+0j) ,
            #         (-0.21026087843552282+0j)])
    """
2326
    if in_dygraph_mode():
2327
        return _C_ops.eig(x)
2328 2329 2330 2331 2332
    else:
        check_variable_and_dtype(
            x, 'X', ['float32', 'float64', 'complex64', 'complex128'], 'eig'
        )
        helper = LayerHelper('eig', **locals())
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2334 2335
        w = helper.create_variable_for_type_inference(x.dtype)
        v = helper.create_variable_for_type_inference(x.dtype)
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2337 2338 2339
        inputs = {'X': x}
        outputs = {'Eigenvalues': w, 'Eigenvectors': v}
        helper.append_op(type='eig', inputs=inputs, outputs=outputs)
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2341
        return w, v
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2344 2345 2346
def eigvals(x, name=None):
    """
    Compute the eigenvalues of one or more general matrices.
2347 2348 2349

    Warning:
        The gradient kernel of this operator does not yet developed.
2350 2351 2352 2353
        If you need back propagation through this operator, please replace it with paddle.linalg.eig.

    Args:
        x (Tensor): A square matrix or a batch of square matrices whose eigenvalues will be computed.
2354
            Its shape should be `[*, M, M]`, where `*` is zero or more batch dimensions.
2355
            Its data type should be float32, float64, complex64, or complex128.
2356
        name (str, optional): Name for the operation (optional, default is None).
2357
            For more information, please refer to :ref:`api_guide_Name`.
2358

2359
    Returns:
2360 2361
        Tensor, A tensor containing the unsorted eigenvalues which has the same batch
        dimensions with `x`. The eigenvalues are complex-valued even when `x` is real.
2362 2363 2364 2365 2366

    Examples:
        .. code-block:: python

            import paddle
2367

2368 2369 2370 2371 2372 2373 2374 2375 2376 2377 2378 2379 2380 2381 2382
            paddle.set_device("cpu")
            paddle.seed(1234)

            x = paddle.rand(shape=[3, 3], dtype='float64')
            # [[0.02773777, 0.93004224, 0.06911496],
            #  [0.24831591, 0.45733623, 0.07717843],
            #  [0.48016702, 0.14235102, 0.42620817]])

            print(paddle.linalg.eigvals(x))
            # [(-0.27078833542132674+0j), (0.29962280156230725+0j), (0.8824477020120244+0j)] #complex128
    """

    x_shape = list(x.shape)
    if len(x_shape) < 2:
        raise ValueError(
2383 2384 2385 2386
            "The dimension of Input(x) should be at least 2, but received x's dimention = {}, x's shape = {}".format(
                len(x_shape), x_shape
            )
        )
2387 2388 2389

    if x_shape[-1] != x_shape[-2]:
        raise ValueError(
2390 2391 2392 2393
            "The last two dimensions of Input(x) should be equal, but received x's shape = {}".format(
                x_shape
            )
        )
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    if in_dygraph_mode():
2396
        return _C_ops.eigvals(x)
2397
    else:
2398 2399 2400 2401 2402 2403
        check_variable_and_dtype(
            x,
            'dtype',
            ['float32', 'float64', 'complex64', 'complex128'],
            'eigvals',
        )
2404 2405 2406 2407
        helper = LayerHelper('eigvals', **locals())
        out = helper.create_variable_for_type_inference(dtype=x.dtype)
        helper.append_op(type='eigvals', inputs={'X': x}, outputs={'Out': out})
        return out
2408 2409


2410 2411 2412 2413
def multi_dot(x, name=None):
    """
    Multi_dot is an operator that calculates multiple matrix multiplications.

2414
    Supports inputs of float16(only GPU support), float32 and float64 dtypes. This function does not
2415 2416 2417 2418 2419 2420 2421 2422 2423 2424 2425 2426 2427 2428 2429 2430 2431 2432 2433 2434 2435 2436 2437 2438 2439 2440 2441 2442 2443 2444 2445 2446 2447 2448 2449 2450
    support batched inputs.

    The input tensor in [x] must be 2-D except for the first and last can be 1-D.
    If the first tensor is a 1-D vector of shape(n, ) it is treated as row vector
    of shape(1, n), similarly if the last tensor is a 1D vector of shape(n, ), it
    is treated as a column vector of shape(n, 1).

    If the first and last tensor are 2-D matrix, then the output is also 2-D matrix,
    otherwise the output is a 1-D vector.

    Multi_dot will select the lowest cost multiplication order for calculation. The
    cost of multiplying two matrices with shapes (a, b) and (b, c) is a * b * c.
    Given matrices A, B, C with shapes (20, 5), (5, 100), (100, 10) respectively,
    we can calculate the cost of different multiplication orders as follows:
    - Cost((AB)C) = 20x5x100 + 20x100x10 = 30000
    - Cost(A(BC)) = 5x100x10 + 20x5x10 = 6000

    In this case, multiplying B and C first, then multiply A, which is 5 times faster
    than sequential calculation.

    Args:
        x ([Tensor]): The input tensors which is a list Tensor.
        name(str|None): A name for this layer(optional). If set None, the layer
            will be named automatically.

    Returns:
        Tensor: The output Tensor.


    Examples:

    .. code-block:: python

        import paddle

        # A * B
2451 2452
        A = paddle.rand([3, 4])
        B = paddle.rand([4, 5])
2453
        out = paddle.linalg.multi_dot([A, B])
2454
        print(out.shape)
2455 2456 2457
        # [3, 5]

        # A * B * C
2458 2459 2460
        A = paddle.rand([10, 5])
        B = paddle.rand([5, 8])
        C = paddle.rand([8, 7])
2461
        out = paddle.linalg.multi_dot([A, B, C])
2462
        print(out.shape)
2463 2464 2465
        # [10, 7]

    """
2466
    if in_dygraph_mode():
2467
        return _C_ops.multi_dot(x)
2468 2469 2470 2471 2472 2473 2474 2475 2476 2477 2478 2479 2480
    else:
        check_type(x, 'x', (list, tuple), 'multi_dot')
        for id, item in enumerate(x):
            check_variable_and_dtype(
                item,
                'x[' + str(id) + ']',
                ['float16', 'float32', 'float64'],
                'multi_dot',
            )
            if item.dtype != x[0].dtype:
                raise TypeError(
                    "All the Tensors in the input must have the same data type."
                )
2481

2482 2483 2484 2485 2486
        helper = LayerHelper('multi_dot', **locals())
        dtype = helper.input_dtype(input_param_name='x')
        out = helper.create_variable_for_type_inference(dtype)
        helper.append_op(
            type='multi_dot', inputs={"X": x}, outputs={"Out": out}
2487
        )
2488
        return out
2489 2490 2491 2492


def eigh(x, UPLO='L', name=None):
    """
2493
    Compute the eigenvalues and eigenvectors of a
2494 2495 2496 2497 2498 2499 2500 2501 2502 2503 2504
    complex Hermitian (conjugate symmetric) or a real symmetric matrix.

    Args:
        x (Tensor): A tensor with shape :math:`[*, N, N]` , The data type of the input Tensor x
            should be one of float32, float64, complex64, complex128.
        UPLO(str, optional): (string, default 'L'), 'L' represents the lower triangular matrix,
                        "'U' represents the upper triangular matrix.".
        name(str, optional): The default value is None.  Normally there is no need for user to set this
            property.  For more information, please refer to :ref:`api_guide_Name`.

    Returns:
2505 2506 2507 2508
        - out_value(Tensor):  A Tensor with shape [*, N] and data type of float32 and float64.
            The eigenvalues of eigh op.
        - out_vector(Tensor): A Tensor with shape [*, N, N] and data type of float32,float64,
            complex64 and complex128. The eigenvectors of eigh op.
2509 2510 2511 2512 2513 2514

    Examples:
        .. code-block:: python

            import paddle

2515
            x = paddle.to_tensor([[1, -2j], [2j, 5]])
2516
            out_value, out_vector = paddle.linalg.eigh(x, UPLO='L')
2517 2518 2519 2520 2521 2522 2523
            print(out_value)
            #[0.17157288, 5.82842712]
            print(out_vector)
            #[(-0.9238795325112867+0j), (-0.3826834323650898+0j)],
            #[ 0.3826834323650898j    , -0.9238795325112867j    ]]

    """
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    if in_dygraph_mode():
2525
        return _C_ops.eigh(x, UPLO)
2526
    else:
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2528 2529 2530 2531 2532 2533 2534 2535 2536 2537 2538 2539 2540 2541 2542 2543
        def __check_input(x, UPLO):
            x_shape = list(x.shape)
            if len(x.shape) < 2:
                raise ValueError(
                    "Input(input) only support >=2 tensor, but received "
                    "length of Input(input) is %s." % len(x.shape)
                )
            if x_shape[-1] != x_shape[-2]:
                raise ValueError(
                    "The input matrix must be batches of square matrices. But received x's dimention: {}".format(
                        x_shape
                    )
                )
            if UPLO != 'L' and UPLO != 'U':
                raise ValueError(
                    "UPLO must be L or U. But received UPLO is: {}".format(UPLO)
2544
                )
2545

2546
        __check_input(x, UPLO)
2547

2548 2549 2550 2551 2552 2553 2554
        helper = LayerHelper('eigh', **locals())
        check_variable_and_dtype(
            x,
            'dtype',
            ['float32', 'float64', 'complex64', 'complex128'],
            'eigh',
        )
2555

2556 2557
        out_value = helper.create_variable_for_type_inference(dtype=x.dtype)
        out_vector = helper.create_variable_for_type_inference(dtype=x.dtype)
2558

2559 2560 2561 2562 2563 2564 2565
        helper.append_op(
            type='eigh',
            inputs={'X': x},
            outputs={'Eigenvalues': out_value, 'Eigenvectors': out_vector},
            attrs={'UPLO': UPLO},
        )
        return out_value, out_vector
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def pinv(x, rcond=1e-15, hermitian=False, name=None):
    r"""
2570
    Calculate pseudo inverse via SVD(singular value decomposition)
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    of one matrix or batches of regular matrix.

    .. math::

        if hermitian == False:
            x = u * s * vt  (SVD)
            out = v * 1/s * ut
        else:
            x = u * s * ut  (eigh)
            out = u * 1/s * u.conj().transpose(-2,-1)
2581

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    If x is hermitian or symmetric matrix, svd will be replaced with eigh.

    Args:
2585 2586 2587
        x(Tensor): The input tensor. Its shape should be (*, m, n)
            where * is zero or more batch dimensions. m and n can be
            arbitraty positive number. The data type of x should be
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            float32 or float64 or complex64 or complex128. When data
            type is complex64 or cpmplex128, hermitian should be set
            True.

2592
        rcond(Tensor, optional): the tolerance value to determine
2593
            when is a singular value zero. Default:1e-15.
2594 2595

        hermitian(bool, optional): indicates whether x is Hermitian
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            if complex or symmetric if real. Default: False.
2597 2598

        name(str|None): A name for this layer(optional). If set None,
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            the layer will be named automatically.
2600

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    Returns:
2602
        Tensor: The tensor with same data type with x. it represents
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        pseudo inverse of x. Its shape should be (*, n, m).
2604

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    Examples:
        .. code-block:: python

            import paddle

            x = paddle.arange(15).reshape((3, 5)).astype('float64')
            input = paddle.to_tensor(x)
            out = paddle.linalg.pinv(input)
            print(input)
            print(out)

            # input:
            # [[0. , 1. , 2. , 3. , 4. ],
            # [5. , 6. , 7. , 8. , 9. ],
            # [10., 11., 12., 13., 14.]]

            # out:
            # [[-0.22666667, -0.06666667,  0.09333333],
            # [-0.12333333, -0.03333333,  0.05666667],
            # [-0.02000000,  0.00000000,  0.02000000],
            # [ 0.08333333,  0.03333333, -0.01666667],
            # [ 0.18666667,  0.06666667, -0.05333333]]

            # one can verify : x * out * x = x ;
            # or              out * x * out = x ;
    """
2631 2632 2633
    if in_dygraph_mode():
        if not hermitian:
            # combine svd and matmul op
2634 2635
            u, s, vt = _C_ops.svd(x, False)
            max_singular_val = _C_ops.max(s, [-1], True)
2636 2637 2638 2639
            rcond = paddle.to_tensor(rcond, dtype=x.dtype)
            cutoff = rcond * max_singular_val
            y = float('inf')
            y = paddle.to_tensor(y, dtype=x.dtype)
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2641 2642 2643 2644 2645 2646
            condition = s > cutoff
            cond_int = cast(condition, s.dtype)
            cond_not_int = cast(logical_not(condition), s.dtype)
            out1 = multiply(1 / s, cond_int)
            out2 = multiply(1 / y, cond_not_int)
            singular = add(out1, out2)
2647
            st = _C_ops.unsqueeze(singular, [-2])
2648 2649 2650

            dims = list(range(len(vt.shape)))
            perm = dims[:-2] + [dims[-1]] + [dims[-2]]
2651
            v = _C_ops.transpose(vt, perm)
2652 2653

            out_1 = v * st
2654
            out_2 = _C_ops.matmul(out_1, u, False, True)
2655 2656 2657
            return out_2
        else:
            # combine eigh and matmul op
2658
            s, u = _C_ops.eigh(x, 'UPLO')
2659
            s_abs = paddle.abs(s)
2660
            max_singular_val = _C_ops.max(s_abs, [-1], True)
2661 2662 2663 2664 2665 2666 2667 2668 2669 2670 2671
            rcond = paddle.to_tensor(rcond, dtype=s.dtype)
            cutoff = rcond * max_singular_val
            y = float('inf')
            y = paddle.to_tensor(y, dtype=s.dtype)

            condition = s_abs > cutoff
            cond_int = cast(condition, s.dtype)
            cond_not_int = cast(logical_not(condition), s.dtype)
            out1 = multiply(1 / s, cond_int)
            out2 = multiply(1 / y, cond_not_int)
            singular = add(out1, out2)
2672
            st = _C_ops.unsqueeze(singular, [-2])
2673 2674

            out_1 = u * st
2675 2676
            u_conj = _C_ops.conj(u)
            out_2 = _C_ops.matmul(out_1, u_conj, False, True)
2677
            return out_2
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    else:
        if not hermitian:
            helper = LayerHelper('pinv', **locals())
            dtype = x.dtype
            check_variable_and_dtype(x, 'x', ['float32', 'float64'], 'pinv')

            u = helper.create_variable_for_type_inference(dtype)
            s = helper.create_variable_for_type_inference(dtype)
            vt = helper.create_variable_for_type_inference(dtype)
            helper.append_op(
                type='svd',
                inputs={'X': [x]},
2690
                outputs={'U': u, 'VH': vt, 'S': s},
2691 2692
                attrs={'full_matrices': False},
            )
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            max_singular_val = helper.create_variable_for_type_inference(dtype)
2695 2696 2697 2698 2699 2700
            helper.append_op(
                type='reduce_max',
                inputs={'X': s},
                outputs={'Out': max_singular_val},
                attrs={'dim': [-1], 'keep_dim': True, 'reduce_all': False},
            )
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2702
            rcond = full(shape=[1], fill_value=rcond, dtype=dtype)
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            cutoff = rcond * max_singular_val
            y = float('inf')
2705
            y = full(shape=[1], fill_value=y, dtype=dtype)
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            condition = s > cutoff
2708 2709 2710 2711 2712
            cond_int = cast(condition, dtype)
            cond_not_int = cast(logical_not(condition), dtype)
            out1 = multiply(1 / s, cond_int)
            out2 = multiply(1 / y, cond_not_int)
            singular = add(out1, out2)
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            st = helper.create_variable_for_type_inference(dtype=dtype)
            st_shape = helper.create_variable_for_type_inference(dtype=dtype)
2716 2717 2718 2719 2720 2721
            helper.append_op(
                type='unsqueeze2',
                inputs={'X': singular},
                attrs={'axes': [-2]},
                outputs={'Out': st, 'XShape': st_shape},
            )
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            dims = list(range(len(vt.shape)))
            perm = dims[:-2] + [dims[-1]] + [dims[-2]]
            v = helper.create_variable_for_type_inference(dtype)
            v_shape = helper.create_variable_for_type_inference(dtype)
2727 2728 2729 2730 2731 2732
            helper.append_op(
                type='transpose2',
                inputs={'X': [vt]},
                outputs={'Out': [v], 'XShape': [v_shape]},
                attrs={'axis': perm},
            )
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            out_1 = helper.create_variable_for_type_inference(dtype)
2735 2736 2737 2738 2739 2740
            helper.append_op(
                type='elementwise_mul',
                inputs={'X': v, 'Y': st},
                outputs={'Out': out_1},
                attrs={'axis': -1, 'use_mkldnn': False},
            )
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            out_1 = helper.append_activation(out_1)

            out_2 = helper.create_variable_for_type_inference(dtype)
            helper.append_op(
                type='matmul_v2',
2746
                inputs={'X': out_1, 'Y': u},
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                outputs={'Out': out_2},
2748
                attrs={'trans_x': False, 'trans_y': True},
2749
            )
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            return out_2
        else:
            helper = LayerHelper('pinv', **locals())
            dtype = x.dtype
            check_variable_and_dtype(
2755 2756 2757 2758 2759
                x,
                'dtype',
                ['float32', 'float64', 'complex64', 'complex128'],
                'pinv',
            )
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            if dtype == paddle.complex128:
                s_type = 'float64'
            elif dtype == paddle.complex64:
                s_type = 'float32'
            else:
                s_type = dtype

            u = helper.create_variable_for_type_inference(dtype)
            s = helper.create_variable_for_type_inference(s_type)
2770 2771 2772 2773 2774 2775
            helper.append_op(
                type='eigh',
                inputs={'X': x},
                outputs={'Eigenvalues': s, 'Eigenvectors': u},
                attrs={'UPLO': 'L'},
            )
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            s_abs = helper.create_variable_for_type_inference(s_type)
2777 2778 2779
            helper.append_op(
                type='abs', inputs={'X': s}, outputs={'Out': s_abs}
            )
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            max_singular_val = helper.create_variable_for_type_inference(s_type)
2781 2782 2783 2784 2785 2786
            helper.append_op(
                type='reduce_max',
                inputs={'X': s_abs},
                outputs={'Out': max_singular_val},
                attrs={'dim': [-1], 'keep_dim': True, 'reduce_all': False},
            )
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2788
            rcond = full(shape=[1], fill_value=rcond, dtype=s_type)
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            cutoff = rcond * max_singular_val
            y = float('inf')
2791
            y = full(shape=[1], fill_value=y, dtype=s_type)
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            condition = s_abs > cutoff
2794 2795 2796 2797 2798
            cond_int = cast(condition, s_type)
            cond_not_int = cast(logical_not(condition), s_type)
            out1 = multiply(1 / s, cond_int)
            out2 = multiply(1 / y, cond_not_int)
            singular = add(out1, out2)
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            st = helper.create_variable_for_type_inference(dtype=s_type)
            st_shape = helper.create_variable_for_type_inference(dtype=s_type)
2802 2803 2804 2805 2806 2807
            helper.append_op(
                type='unsqueeze2',
                inputs={'X': singular},
                attrs={'axes': [-2]},
                outputs={'Out': st, 'XShape': st_shape},
            )
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            out_1 = helper.create_variable_for_type_inference(dtype)
2810 2811 2812 2813 2814 2815
            helper.append_op(
                type='elementwise_mul',
                inputs={'X': u, 'Y': st},
                outputs={'Out': out_1},
                attrs={'axis': -1, 'use_mkldnn': False},
            )
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            out_1 = helper.append_activation(out_1)

            u_conj = helper.create_variable_for_type_inference(dtype)
2819 2820 2821
            helper.append_op(
                type='conj', inputs={'X': u}, outputs={'Out': [u_conj]}
            )
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            out_2 = helper.create_variable_for_type_inference(dtype)
            helper.append_op(
                type='matmul_v2',
2826
                inputs={'X': out_1, 'Y': u_conj},
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                outputs={'Out': out_2},
2828
                attrs={'trans_x': False, 'trans_y': True},
2829
            )
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            return out_2
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def solve(x, y, name=None):
    r"""
2835

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    Computes the solution of a square system of linear equations with a unique solution for input 'X' and 'Y'.
2837
    Let :math:`X` be a sqaure matrix or a batch of square matrices, :math:`Y` be
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    a vector/matrix or a batch of vectors/matrices, the equation should be:
2839

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2840 2841
    .. math::
        Out = X^-1 * Y
2842 2843

    Specifically, this system of linear equations has one solution if and only if input 'X' is invertible.
2844

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    Args:
2846
        x (Tensor): A square matrix or a batch of square matrices. Its shape should be ``[*, M, M]``, where ``*`` is zero or
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            more batch dimensions. Its data type should be float32 or float64.
2848
        y (Tensor): A vector/matrix or a batch of vectors/matrices. Its shape should be ``[*, M, K]``, where ``*`` is zero or
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            more batch dimensions. Its data type should be float32 or float64.
2850
        name(str, optional): Name for the operation (optional, default is None).
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            For more information, please refer to :ref:`api_guide_Name`.
2852

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    Returns:
2854
        Tensor: The solution of a square system of linear equations with a unique solution for input 'x' and 'y'.
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        Its data type should be the same as that of `x`.
2856

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    Examples:
2858

2859
        .. code-block:: python
2860

2861 2862 2863
            # a square system of linear equations:
            # 2*X0 + X1 = 9
            # X0 + 2*X1 = 8
2864

2865 2866 2867 2868 2869
            import paddle

            x = paddle.to_tensor([[3, 1],[1, 2]], dtype="float64")
            y = paddle.to_tensor([9, 8], dtype="float64")
            out = paddle.linalg.solve(x, y)
2870

2871 2872
            print(out)
            # [2., 3.])
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    """
2874
    if in_dygraph_mode():
2875
        return _C_ops.solve(x, y)
2876 2877 2878 2879 2880 2881
    else:
        inputs = {"X": [x], "Y": [y]}
        helper = LayerHelper("solve", **locals())
        check_variable_and_dtype(x, 'x', ['float32', 'float64'], 'solve')
        check_variable_and_dtype(y, 'y', ['float32', 'float64'], 'solve')
        out = helper.create_variable_for_type_inference(dtype=x.dtype)
2882

2883 2884 2885 2886
        helper.append_op(
            type="solve", inputs={"X": x, "Y": y}, outputs={"Out": out}
        )
        return out
2887 2888


2889 2890 2891
def triangular_solve(
    x, y, upper=True, transpose=False, unitriangular=False, name=None
):
2892
    r"""
2893 2894
    Computes the solution of a system of equations with a triangular coefficient.  `x` is coefficient matrix
    `y` is multiple right-hand sides of equations.
2895

2896 2897 2898 2899 2900 2901 2902 2903 2904 2905 2906 2907
    Input `x` and `y` is 2D matrices or batches of 2D matrices. If the inputs are batches, the outputs is also
    batches.

    Equations can be described as:

    .. math::
        x * Out = y

    Solution of Equations is:

    .. math::
        Out = x ^ {-1} * y
2908 2909 2910 2911

    Args:
        x (Tensor): The input triangular coefficient matrix. Its shape should be `[*, M, M]`, where `*` is zero or
            more batch dimensions. Its data type should be float32 or float64.
2912
        y (Tensor): Multiple right-hand sides of system of equations. Its shape should be `[*, M, K]`, where `*` is
2913
            zero or more batch dimensions. Its data type should be float32 or float64.
2914
        upper (bool, optional): Whether to solve the upper-triangular system of equations (default) or the lower-triangular
2915 2916
            system of equations. Default: True.
        transpose (bool, optional): whether `x` should be transposed before calculation. Default: False.
2917
        unitriangular (bool, optional): whether `x` is unit triangular. If True, the diagonal elements of `x` are assumed
2918 2919 2920 2921 2922 2923 2924 2925
            to be 1 and not referenced from `x` . Default: False.
        name(str, optional): Name for the operation (optional, default is None).
            For more information, please refer to :ref:`api_guide_Name`.

    Returns:
        Tensor: The solution of the system of equations. Its data type should be the same as that of `x`.

    Examples:
2926
        .. code-block:: python
2927

2928 2929 2930 2931
            # a square system of linear equations:
            # x1 +   x2  +   x3 = 0
            #      2*x2  +   x3 = -9
            #               -x3 = 5
2932

2933 2934 2935 2936 2937 2938
            import paddle
            x = paddle.to_tensor([[1, 1, 1],
                                  [0, 2, 1],
                                  [0, 0,-1]], dtype="float64")
            y = paddle.to_tensor([[0], [-9], [5]], dtype="float64")
            out = paddle.linalg.triangular_solve(x, y, upper=True)
2939

2940 2941
            print(out)
            # [7, -2, -5]
2942
    """
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2943
    if in_dygraph_mode():
2944
        return _C_ops.triangular_solve(x, y, upper, transpose, unitriangular)
2945 2946 2947 2948 2949
    else:
        inputs = {"X": [x], "Y": [y]}
        helper = LayerHelper("triangular_solve", **locals())
        check_variable_and_dtype(
            x, 'x', ['float32', 'float64'], 'triangular_solve'
2950
        )
2951 2952 2953 2954
        check_variable_and_dtype(
            y, 'y', ['float32', 'float64'], 'triangular_solve'
        )
        out = helper.create_variable_for_type_inference(dtype=x.dtype)
2955

2956 2957 2958 2959 2960 2961 2962 2963 2964 2965 2966
        helper.append_op(
            type='triangular_solve',
            inputs={'X': x, 'Y': y},
            outputs={'Out': out},
            attrs={
                'upper': upper,
                'transpose': transpose,
                'unitriangular': unitriangular,
            },
        )
        return out
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def cholesky_solve(x, y, upper=False, name=None):
    r"""
    Solves a linear system of equations A @ X = B, given A's Cholesky factor matrix u and  matrix B.

    Input `x` and `y` is 2D matrices or batches of 2D matrices. If the inputs are batches, the outputs
    is also batches.

    Args:
        x (Tensor): The input matrix which is upper or lower triangular Cholesky factor of square matrix A. Its shape should be `[*, M, M]`, where `*` is zero or
            more batch dimensions. Its data type should be float32 or float64.
2979
        y (Tensor): Multiple right-hand sides of system of equations. Its shape should be `[*, M, K]`, where `*` is
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            zero or more batch dimensions. Its data type should be float32 or float64.
        upper (bool, optional): whether to consider the Cholesky factor as a lower or upper triangular matrix. Default: False.
        name(str, optional): Name for the operation (optional, default is None).
            For more information, please refer to :ref:`api_guide_Name`.

    Returns:
        Tensor: The solution of the system of equations. Its data type is the same as that of `x`.

    Examples:
2989
        .. code-block:: python
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2990

2991
            import paddle
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2992

2993 2994 2995 2996 2997
            u = paddle.to_tensor([[1, 1, 1],
                                    [0, 2, 1],
                                    [0, 0,-1]], dtype="float64")
            b = paddle.to_tensor([[0], [-9], [5]], dtype="float64")
            out = paddle.linalg.cholesky_solve(b, u, upper=True)
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2999 3000
            print(out)
            # [-2.5, -7, 9.5]
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3001
    """
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3002
    if in_dygraph_mode():
3003
        return _C_ops.cholesky_solve(x, y, upper)
3004 3005 3006 3007 3008 3009 3010 3011 3012
    else:
        helper = LayerHelper("cholesky_solve", **locals())
        check_variable_and_dtype(
            x, 'x', ['float32', 'float64'], 'cholesky_solve'
        )
        check_variable_and_dtype(
            y, 'y', ['float32', 'float64'], 'cholesky_solve'
        )
        out = helper.create_variable_for_type_inference(dtype=x.dtype)
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3014 3015 3016 3017 3018 3019 3020
        helper.append_op(
            type='cholesky_solve',
            inputs={'X': x, 'Y': y},
            outputs={'Out': out},
            attrs={'upper': upper},
        )
        return out
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3023 3024
def eigvalsh(x, UPLO='L', name=None):
    """
3025
    Computes the eigenvalues of a
3026 3027 3028
    complex Hermitian (conjugate symmetric) or a real symmetric matrix.

    Args:
3029
        x (Tensor): A tensor with shape :math:`[*, M, M]` , where * is zero or greater batch dimension. The data type of the input Tensor x
3030 3031 3032 3033 3034 3035 3036 3037 3038 3039 3040 3041 3042
            should be one of float32, float64, complex64, complex128.
        UPLO(str, optional): Lower triangular part of a (‘L’, default) or the upper triangular part (‘U’).
        name(str, optional): The default value is None.  Normally there is no need for user to set this
            property.  For more information, please refer to :ref:`api_guide_Name`.

    Returns:
        Tensor: The tensor eigenvalues in ascending order.

    Examples:
        .. code-block:: python

            import paddle

3043
            x = paddle.to_tensor([[1, -2j], [2j, 5]])
3044 3045
            out_value = paddle.eigvalsh(x, UPLO='L')
            print(out_value)
3046 3047
            # Tensor(shape=[2], dtype=float32, place=Place(cpu), stop_gradient=True,
            #        [0.17157286, 5.82842731])
3048
    """
3049
    if in_dygraph_mode():
3050
        values, _ = _C_ops.eigvalsh(x, UPLO, x.stop_gradient)
3051
        return values
3052
    else:
3053

3054 3055 3056 3057 3058 3059 3060 3061 3062 3063 3064 3065 3066 3067 3068 3069
        def __check_input(x, UPLO):
            x_shape = list(x.shape)
            if len(x.shape) < 2:
                raise ValueError(
                    "Input(input) only support >=2 tensor, but received "
                    "length of Input(input) is %s." % len(x.shape)
                )
            if x_shape[-1] != x_shape[-2]:
                raise ValueError(
                    "The input matrix must be batches of square matrices. But received x's dimention: {}".format(
                        x_shape
                    )
                )
            if UPLO != 'L' and UPLO != 'U':
                raise ValueError(
                    "UPLO must be L or U. But received UPLO is: {}".format(UPLO)
3070
                )
3071

3072
        __check_input(x, UPLO)
3073

3074 3075 3076 3077 3078 3079 3080
        helper = LayerHelper('eigvalsh', **locals())
        check_variable_and_dtype(
            x,
            'dtype',
            ['float32', 'float64', 'complex64', 'complex128'],
            'eigvalsh',
        )
3081

3082 3083
        out_value = helper.create_variable_for_type_inference(dtype=x.dtype)
        out_vector = helper.create_variable_for_type_inference(dtype=x.dtype)
3084

3085 3086 3087 3088 3089 3090 3091 3092
        is_test = x.stop_gradient
        helper.append_op(
            type='eigvalsh',
            inputs={'X': x},
            outputs={'Eigenvalues': out_value, 'Eigenvectors': out_vector},
            attrs={'UPLO': UPLO, 'is_test': is_test},
        )
        return out_value
3093 3094


3095 3096 3097 3098 3099 3100 3101 3102
def lstsq(x, y, rcond=None, driver=None, name=None):
    """
    Computes a solution to
    the least squares problem of a system of linear equations.

    Args:
        x (Tensor): A tensor with shape ``(*, M, N)`` , the data type of the input Tensor ``x``
            should be one of float32, float64.
3103
        y (Tensor): A tensor with shape ``(*, M, K)`` , the data type of the input Tensor ``y``
3104
            should be one of float32, float64.
3105 3106
        rcond(float, optional): The default value is None. A float pointing number used to determine
            the effective rank of ``x``. If ``rcond`` is None, it will be set to max(M, N) times the
3107
            machine precision of x_dtype.
3108 3109 3110
        driver(str, optional): The default value is None. The name of LAPACK method to be used. For
            CPU inputs the valid values are ‘gels’, ‘gelsy’, ‘gelsd, ‘gelss’. For CUDA input, the only
            valid driver is ‘gels’. If ``driver`` is None, ‘gelsy’ is used for CPU inputs and ‘gels’
3111
            for CUDA inputs.
3112
        name(str, optional): The default value is None. Normally there is no need for user to set
3113 3114 3115
            this property. For more information, please refer to :ref:`api_guide_Name`.

    Returns:
3116 3117 3118 3119 3120 3121 3122
        Tuple: A tuple of 4 Tensors which is (``solution``, ``residuals``, ``rank``, ``singular_values``).
        ``solution`` is a tensor with shape ``(*, N, K)``, meaning the least squares solution. ``residuals``
        is a tensor with shape ``(*, K)``, meaning the squared residuals of the solutions, which is computed
        when M > N and every matrix in ``x`` is full-rank, otherwise return an empty tensor. ``rank`` is a tensor
        with shape ``(*)``, meaning the ranks of the matrices in ``x``, which is computed when ``driver`` in
        (‘gelsy’, ‘gelsd’, ‘gelss’), otherwise return an empty tensor. ``singular_values`` is a tensor with
        shape ``(*, min(M, N))``, meaning singular values of the matrices in ``x``, which is computed when
3123 3124 3125 3126 3127 3128 3129 3130 3131 3132 3133 3134 3135 3136 3137 3138 3139 3140 3141 3142 3143 3144 3145 3146 3147 3148 3149 3150 3151 3152 3153 3154
        ``driver`` in (‘gelsd’, ‘gelss’), otherwise return an empty tensor.

    Examples:
        .. code-block:: python

            import paddle

            paddle.set_device("cpu")
            x = paddle.to_tensor([[1, 3], [3, 2], [5, 6.]])
            y = paddle.to_tensor([[3, 4, 6], [5, 3, 4], [1, 2, 1.]])
            results = paddle.linalg.lstsq(x, y, driver="gelsd")
            print(results[0])
            # [[ 0.78350395, -0.22165027, -0.62371236],
            # [-0.11340097,  0.78866047,  1.14948535]]
            print(results[1])
            # [19.81443405, 10.43814468, 30.56185532])
            print(results[2])
            # 2
            print(results[3])
            # [9.03455734, 1.54167950]

            x = paddle.to_tensor([[10, 2, 3], [3, 10, 5], [5, 6, 12.]])
            y = paddle.to_tensor([[4, 2, 9], [2, 0, 3], [2, 5, 3.]])
            results = paddle.linalg.lstsq(x, y, driver="gels")
            print(results[0])
            # [[ 0.39386186,  0.10230173,  0.93606132],
            # [ 0.10741687, -0.29028133,  0.11892585],
            # [-0.05115091,  0.51918161, -0.19948854]]
            print(results[1])
            # []
    """
    device = paddle.get_device()
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    if device == "cpu":
        if driver not in (None, "gels", "gelss", "gelsd", "gelsy"):
            raise ValueError(
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                "Only support valid driver is 'gels', 'gelss', 'gelsd', 'gelsy' or None for CPU inputs. But got {}".format(
                    driver
                )
            )
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        driver = "gelsy" if driver is None else driver
    elif "gpu" in device:
        if driver not in (None, "gels"):
            raise ValueError(
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                "Only support valid driver is 'gels' or None for CUDA inputs. But got {}".format(
                    driver
                )
            )
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        driver = "gels" if driver is None else driver
    else:
        raise RuntimeError("Only support lstsq api for CPU or CUDA device.")

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    if not (x.dtype == y.dtype and x.dtype in (paddle.float32, paddle.float64)):
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        raise ValueError(
            "Only support x and y have the same dtype such as 'float32' and 'float64'."
        )

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    if x.ndim < 2:
        raise ValueError(
            f"The shape of x should be (*, M, N), but received ndim is [{x.ndim} < 2]"
        )

    if y.ndim < 2:
        raise ValueError(
            f"The shape of y should be (*, M, K), but received ndim is [{y.ndim} < 2]"
        )

    if x.shape[-2] != y.shape[-2]:
        raise ValueError(
            f"x with shape (*, M = {x.shape[-2]}, N) and y with shape (*, M = {y.shape[-2]}, K) should have same M."
        )

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    if rcond is None:
        if x.dtype == paddle.float32:
            rcond = 1e-7 * max(x.shape[-2], x.shape[-1])
        elif x.dtype == paddle.float64:
            rcond = 1e-15 * max(x.shape[-2], x.shape[-1])

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    if in_dygraph_mode():
        solution, residuals, rank, singular_values = _C_ops.lstsq(
            x, y, rcond, driver
        )
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        if driver == "gels":
            rank = paddle.empty(shape=[0], dtype=paddle.int32)
            singular_values = paddle.empty(shape=[0], dtype=x.dtype)
        elif driver == "gelsy":
            singular_values = paddle.empty(shape=[0], dtype=x.dtype)

        return solution, residuals, rank, singular_values
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    else:
        helper = LayerHelper('lstsq', **locals())
        check_variable_and_dtype(
            x,
            'dtype',
            ['float32', 'float64', 'complex64', 'complex128'],
            'lstsq',
        )
        check_variable_and_dtype(
            y,
            'dtype',
            ['float32', 'float64', 'complex64', 'complex128'],
            'lstsq',
        )
3225

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        solution = helper.create_variable_for_type_inference(dtype=x.dtype)
        residuals = helper.create_variable_for_type_inference(dtype=x.dtype)
        rank = helper.create_variable_for_type_inference(dtype=paddle.int32)
        singular_values = helper.create_variable_for_type_inference(
            dtype=x.dtype
        )
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        helper.append_op(
            type='lstsq',
            inputs={'X': x, 'Y': y},
            outputs={
                'Solution': solution,
                'Residuals': residuals,
                'Rank': rank,
                'SingularValues': singular_values,
            },
            attrs={'rcond': rcond, 'driver': driver},
        )
3244

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        if driver == "gels":
            rank = paddle.static.data(name='rank', shape=[0])
            singular_values = paddle.static.data(
                name='singular_values', shape=[0]
            )
        elif driver == "gelsy":
            singular_values = paddle.static.data(
                name='singular_values', shape=[0]
            )
3254

3255
        return solution, residuals, rank, singular_values
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def corrcoef(x, rowvar=True, name=None):
    """
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    A correlation coefficient matrix indicate the correlation of each pair variables in the input matrix.
    For example, for an N-dimensional samples X=[x1,x2,…xN]T, then the correlation coefficient matrix
    element Rij is the correlation of xi and xj. The element Rii is the covariance of xi itself.

    The relationship between the correlation coefficient matrix `R` and the
    covariance matrix `C`, is

    .. math:: R_{ij} = \\frac{ C_{ij} } { \\sqrt{ C_{ii} * C_{jj} } }

    The values of `R` are between -1 and 1.

    Parameters:

        x(Tensor): A N-D(N<=2) Tensor containing multiple variables and observations. By default, each row of x represents a variable. Also see rowvar below.
        rowvar(Bool, optional): If rowvar is True (default), then each row represents a variable, with observations in the columns. Default: True.
        name(str, optional): Name of the output. Default is None. It's used to print debug info for developers. Details: :ref:`api_guide_Name`.

    Returns:

        The correlation coefficient matrix of the variables.

    Examples:
        .. code-block:: python
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            import paddle

            xt = paddle.rand((3,4))
            print(paddle.linalg.corrcoef(xt))

            # Tensor(shape=[3, 3], dtype=float32, place=Place(cpu), stop_gradient=True,
            # [[ 1.        , -0.73702252,  0.66228950],
            # [-0.73702258,  1.        , -0.77104872],
            # [ 0.66228974, -0.77104825,  1.        ]])

    """
    if len(x.shape) > 2 or len(x.shape) < 1:
        raise ValueError(
            "Input(x) only support N-D (1<=N<=2) tensor in corrcoef, but received "
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            "length of Input(input) is %s." % len(x.shape)
        )
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    check_variable_and_dtype(x, 'dtype', ['float32', 'float64'], 'corrcoef')

    c = cov(x, rowvar)
3304
    if c.ndim == 0:
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        # scalar covariance
        # nan if incorrect value (nan, inf, 0), 1 otherwise
        return c / c

    d = paddle.diag(c)

    if paddle.is_complex(d):
        d = d.real()
    stddev = paddle.sqrt(d)
    c /= stddev[:, None]
    c /= stddev[None, :]

    # Clip to [-1, 1].  This does not guarantee
    if paddle.is_complex(c):
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        return paddle.complex(
            paddle.clip(c.real(), -1, 1), paddle.clip(c.imag(), -1, 1)
        )
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    else:
        c = paddle.clip(c, -1, 1)

    return c