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import paddle
from paddle.distribution.normal import Normal
from paddle.distribution.transform import ExpTransform
from paddle.distribution.transformed_distribution import TransformedDistribution


class LogNormal(TransformedDistribution):
    r"""The LogNormal distribution with location `loc` and `scale` parameters.

    .. math::

        X \sim Normal(\mu, \sigma)

        Y = exp(X) \sim LogNormal(\mu, \sigma)


    Due to LogNormal distribution is based on the transformation of Normal distribution, we call that :math:`Normal(\mu, \sigma)` is the underlying distribution of :math:`LogNormal(\mu, \sigma)`

    Mathematical details

    The probability density function (pdf) is

    .. math::
        pdf(x; \mu, \sigma) = \frac{1}{\sigma x \sqrt{2\pi}}e^{(-\frac{(ln(x) - \mu)^2}{2\sigma^2})}

    In the above equation:

    * :math:`loc = \mu`: is the means of the underlying Normal distribution.
    * :math:`scale = \sigma`: is the stddevs of the underlying Normal distribution.

    Args:
        loc(int|float|list|tuple|numpy.ndarray|Tensor): The means of the underlying Normal distribution.
        scale(int|float|list|tuple|numpy.ndarray|Tensor): The stddevs of the underlying Normal distribution.

    Examples:
        .. code-block:: python

          import paddle
          from paddle.distribution import LogNormal

          # Define a single scalar LogNormal distribution.
          dist = LogNormal(loc=0., scale=3.)
          # Define a batch of two scalar valued LogNormals.
          # The underlying Normal of first has mean 1 and standard deviation 11, the underlying Normal of second 2 and 22.
          dist = LogNormal(loc=[1., 2.], scale=[11., 22.])
          # Get 3 samples, returning a 3 x 2 tensor.
          dist.sample((3, ))

          # Define a batch of two scalar valued LogNormals.
          # Their underlying Normal have mean 1, but different standard deviations.
          dist = LogNormal(loc=1., scale=[11., 22.])

          # Complete example
          value_tensor = paddle.to_tensor([0.8], dtype="float32")

          lognormal_a = LogNormal([0.], [1.])
          lognormal_b = LogNormal([0.5], [2.])
          sample = lognormal_a.sample((2, ))
          # a random tensor created by lognormal distribution with shape: [2, 1]
          entropy = lognormal_a.entropy()
          # [1.4189385] with shape: []
          lp = lognormal_a.log_prob(value_tensor)
          # [-0.72069150] with shape: [1]
          p = lognormal_a.probs(value_tensor)
          # [0.48641577] with shape: [1]
          kl = lognormal_a.kl_divergence(lognormal_b)
          # [0.34939718] with shape: []
    """

    def __init__(self, loc, scale):
        self._base = Normal(loc=loc, scale=scale)
        self.loc = self._base.loc
        self.scale = self._base.scale
        super().__init__(self._base, [ExpTransform()])

    @property
    def mean(self):
        """Mean of lognormal distribuion.

        Returns:
            Tensor: mean value.
        """
        return paddle.exp(self._base.mean + self._base.variance / 2)

    @property
    def variance(self):
        """Variance of lognormal distribution.

        Returns:
            Tensor: variance value.
        """
        return paddle.expm1(self._base.variance) * paddle.exp(
            2 * self._base.mean + self._base.variance
        )

    def entropy(self):
        r"""Shannon entropy in nats.

        The entropy is

        .. math::

            entropy(\sigma) = 0.5 \log (2 \pi e \sigma^2) + \mu

        In the above equation:

        * :math:`loc = \mu`: is the mean of the underlying Normal distribution.
        * :math:`scale = \sigma`: is the stddevs of the underlying Normal distribution.

        Returns:
          Tensor: Shannon entropy of lognormal distribution.

        """
        return self._base.entropy() + self._base.mean

    def probs(self, value):
        """Probability density/mass function.

        Args:
          value (Tensor): The input tensor.

        Returns:
          Tensor: probability.The data type is same with :attr:`value` .

        """
        return paddle.exp(self.log_prob(value))

    def kl_divergence(self, other):
        r"""The KL-divergence between two lognormal distributions.

        The probability density function (pdf) is

        .. math::

            KL\_divergence(\mu_0, \sigma_0; \mu_1, \sigma_1) = 0.5 (ratio^2 + (\frac{diff}{\sigma_1})^2 - 1 - 2 \ln {ratio})

        .. math::

            ratio = \frac{\sigma_0}{\sigma_1}

        .. math::

            diff = \mu_1 - \mu_0

        In the above equation:

        * :math:`loc = \mu_0`: is the means of current underlying Normal distribution.
        * :math:`scale = \sigma_0`: is the stddevs of current underlying Normal distribution.
        * :math:`loc = \mu_1`: is the means of other underlying Normal distribution.
        * :math:`scale = \sigma_1`: is the stddevs of other underlying Normal distribution.
        * :math:`ratio`: is the ratio of scales.
        * :math:`diff`: is the difference between means.

        Args:
            other (LogNormal): instance of LogNormal.

        Returns:
            Tensor: kl-divergence between two lognormal distributions.

        """
        return self._base.kl_divergence(other._base)