[TCP] tcp_cubic: faster cube root

The Newton-Raphson method is quadratically convergent so only a small fixed number of steps are necessary. Therefore it is faster to unroll the loop. Since div64_64 is no longer inline it won't cause code explosion. Also fixes a bug that can occur if x^2 was bigger than 32 bits. Signed-off-by: N Stephen Hemminger <shemminger@linux-foundation.org> Signed-off-by: N David S. Miller <davem@davemloft.net>

[TCP] tcp_cubic: faster cube root
The Newton-Raphson method is quadratically convergent so only a small fixed number of steps are necessary. Therefore it is faster to unroll the loop. Since div64_64 is no longer inline it won't cause code explosion. Also fixes a bug that can occur if x^2 was bigger than 32 bits. Signed-off-by: N Stephen Hemminger <shemminger@linux-foundation.org> Signed-off-by: N David S. Miller <davem@davemloft.net>
c5f5877c · Stephen Hemminger · David S. Miller · 8570419f · c5f5877c
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Showing with 5 addition and 11 deletion

net/ipv4/tcp_cubic.c net/ipv4/tcp_cubic.c +5 -11

未找到文件。
--- a/net/ipv4/tcp_cubic.c
+++ b/net/ipv4/tcp_cubic.c
@@ -96,23 +96,17 @@ static void bictcp_init(struct sock *sk)
 */
 static u32 cubic_root(u64 a)
 {
-	u32 x, x1;
+	u32 x;

 	/* Initial estimate is based on:
 	 * cbrt(x) = exp(log(x) / 3)
 	 */
 	x = 1u << (fls64(a)/3);

-	/*
-	 * Iteration based on:
-	 *                         2
-	 * x    = ( 2 * x  +  a / x  ) / 3
-	 *  k+1          k         k
-	 */
-	do {
-		x1 = x;
-		x = (2 * x + (uint32_t) div64_64(a, x*x)) / 3;
-	} while (abs(x1 - x) > 1);
+	/* converges to 32 bits in 3 iterations */
+	x = (2 * x + (u32)div64_64(a, (u64)x*(u64)x)) / 3;
+	x = (2 * x + (u32)div64_64(a, (u64)x*(u64)x)) / 3;
+	x = (2 * x + (u32)div64_64(a, (u64)x*(u64)x)) / 3;

 	return x;
 }