src/math/expm1minus-f32-avx2-rr1-lut4-p4-perm.c - platform/external/XNNPACK - Git at Google

 // Copyright 2020 Google LLC
 //
 // This source code is licensed under the BSD-style license found in the
 // LICENSE file in the root directory of this source tree.

 #include <assert.h>
 #include <stddef.h>

 #include <immintrin.h>

 #include <xnnpack/common.h>
 #include <xnnpack/math-stubs.h>


 void xnn_math_f32_expm1minus__avx2_rr1_lut4_p4_perm(
     size_t n,
     const float* input,
     float* output)
 {
   assert(n % (8 * sizeof(float)) == 0);

   // The largest x for which expm1f(x) is saturated at -1.0f.
   const __m256 vsat_cutoff = _mm256_set1_ps(-0x1.154246p+4f);
   // Large number such that ulp(magic bias) == exp2(-2)
   const __m256 vmagic_bias = _mm256_set1_ps(0x1.800000p21f);
   const __m256 vlog2e = _mm256_set1_ps(0x1.715476p+0f);
   // Table of exp2(k / 4) values decremented (as integer) by (k << 21), k = 0..3
   const __m256 vtable = _mm256_set_ps(
     0x1.EE89FAp-1f, 0x1.EA09E6p-1f, 0x1.F06FE0p-1f, 0x1.000000p+0f,
     0x1.EE89FAp-1f, 0x1.EA09E6p-1f, 0x1.F06FE0p-1f, 0x1.000000p+0f);
   const __m256 vminus_ln2 = _mm256_set1_ps(-0x1.62E43p-1f);
   // Coefficient of polynomial approximation
   //   exp(t) - 1 ~ t * (1 + t * (c2 + t * (c3 + t * c4)))
   // on [-log(2)/8, log(2)/8]
   const __m256 vc4 = _mm256_set1_ps(0x1.554F9Ap-5f);
   const __m256 vc3 = _mm256_set1_ps(0x1.557082p-3f);
   const __m256 vc2 = _mm256_set1_ps(0x1.000002p-1f);
   const __m256 vone = _mm256_set1_ps(1.0f);

   for (; n != 0; n -= 8 * sizeof(float)) {
     __m256 vx = _mm256_loadu_ps(input);

     // The function saturates at -1 for large negative inputs: expm1f(x) == -1.0f for x <= sat_cutoff ~= -17.328680.
     // To guarantee this behaviour, we clip input at sat_cutoff, and leverage the fact that for our implementation
     // expm1f(sat_cutoff) == -1.0f. The order of operands in the VMAXPS instruction matters: it ensures that NaN
     // inputs are passed unchanged.
     vx = _mm256_max_ps(vsat_cutoff, vx);

     // Compute reduced argument n := round(x / log(2), 2).
     // We do it by adding a large number (magic bias), which cause rounding of the result to 2 fractional bits, then
     // subtracing the large number back. The first addition is combined with multiplication by log2e into a single FMA
     // instruction. The trick with adding large number is valid only within certain bounds (|x / log(2)| <= 2**19,
     // i.e. |x| <= 0x1.62E43p+18 = 363408.75), but that is acceptable, because inputs x are restricted to
     // [-17.328680, 0].
     // Note that addition-subtraction of the large number doesn't cause overflow for inputs in this range.
     __m256 vn = _mm256_fmadd_ps(vx, vlog2e, vmagic_bias);

     // Create a floating-point number s (scale) such that s := 2**n for valid inputs, i.e. -17.328680 <= x <= 0.0. As n
     // has 4 fractional bits, we split s == 2**n = 2**int(n) * 2**frac(n). We create s in two steps:
     // 1. Fetch 2**frac(n) from the table using the 4 low bits of n, as integer. Note that the fetched values are in
     //    the [1.0, 2.0) range, i.e. their floating-point exponent is 0.
     // 2. Adjust fecthed value by addition of int(n) to its floating-point exponent. The result is always a normalized
     //    number, because for -17.328680 <= x <= 0.0 we have -25 <= int(n) <= 0, and thus the adjusted exponent is not
     //    lower than -25.
     //
     // Shift bits 2:10 into 23:31 (position of floating-point exponent).
     const __m256i ven = _mm256_slli_epi32(_mm256_castps_si256(vn), 21);

     // Use bits 0:2 bits of n, as integer, as an index for table lookup of l := 2**frac(n).
     const __m256i vl = _mm256_castps_si256(_mm256_permutevar_ps(vtable, _mm256_castps_si256(vn)));

     // Adjust exponent of the value l fetched from the table to get the final s value.
     const __m256 vs = _mm256_castsi256_ps(_mm256_add_epi32(vl, ven));

     // Subtract the large number back to get final n := round(x / log(2), 2).
     vn = _mm256_sub_ps(vn, vmagic_bias);

     // Compute reduced argument t := x - n * log(2).
     __m256 vt = _mm256_fmadd_ps(vn, vminus_ln2, vx);

     // Compute degree-4 polynomial approximation for exp(t) - 1 on [-log(2)/16, log(2)/16].
     //   P(t) = t * (1 + t * (c2 + t * (c3 + t * c4))) = t + t * (t * (c2 + t * (c3 + t * c4))) = t + t * p
     __m256 vp = _mm256_fmadd_ps(vc4, vt, vc3);
     vp = _mm256_fmadd_ps(vp, vt, vc2);
     vp = _mm256_mul_ps(vp, vt);

     // Reconstruct the exp(x) - 1 value:
     //   exp(x) - 1 = s * (1 + t * (1 + t * (c2 + t * (c3 + t * c4)))) - 1
     //              = (s - 1) + s * (t + t * p)
     //              = ((t * s) + (t * s) * p) + (s - 1)
     vt = _mm256_mul_ps(vt, vs);
     const __m256 vsm1 = _mm256_sub_ps(vs, vone);
     vp = _mm256_fmadd_ps(vp, vt, vt);
     const __m256 vf = _mm256_add_ps(vp, vsm1);

     _mm256_storeu_ps(output, vf);

     input += 8;
     output += 8;
   }
 }
	// Copyright 2020 Google LLC
	//
	// This source code is licensed under the BSD-style license found in the
	// LICENSE file in the root directory of this source tree.

	#include <assert.h>
	#include <stddef.h>

	#include <immintrin.h>

	#include <xnnpack/common.h>
	#include <xnnpack/math-stubs.h>


	void xnn_math_f32_expm1minus__avx2_rr1_lut4_p4_perm(
	size_t n,
	const float* input,
	float* output)
	{
	assert(n % (8 * sizeof(float)) == 0);

	// The largest x for which expm1f(x) is saturated at -1.0f.
	const __m256 vsat_cutoff = _mm256_set1_ps(-0x1.154246p+4f);
	// Large number such that ulp(magic bias) == exp2(-2)
	const __m256 vmagic_bias = _mm256_set1_ps(0x1.800000p21f);
	const __m256 vlog2e = _mm256_set1_ps(0x1.715476p+0f);
	// Table of exp2(k / 4) values decremented (as integer) by (k << 21), k = 0..3
	const __m256 vtable = _mm256_set_ps(
	0x1.EE89FAp-1f, 0x1.EA09E6p-1f, 0x1.F06FE0p-1f, 0x1.000000p+0f,
	0x1.EE89FAp-1f, 0x1.EA09E6p-1f, 0x1.F06FE0p-1f, 0x1.000000p+0f);
	const __m256 vminus_ln2 = _mm256_set1_ps(-0x1.62E43p-1f);
	// Coefficient of polynomial approximation
	// exp(t) - 1 ~ t * (1 + t * (c2 + t * (c3 + t * c4)))
	// on [-log(2)/8, log(2)/8]
	const __m256 vc4 = _mm256_set1_ps(0x1.554F9Ap-5f);
	const __m256 vc3 = _mm256_set1_ps(0x1.557082p-3f);
	const __m256 vc2 = _mm256_set1_ps(0x1.000002p-1f);
	const __m256 vone = _mm256_set1_ps(1.0f);

	for (; n != 0; n -= 8 * sizeof(float)) {
	__m256 vx = _mm256_loadu_ps(input);

	// The function saturates at -1 for large negative inputs: expm1f(x) == -1.0f for x <= sat_cutoff ~= -17.328680.
	// To guarantee this behaviour, we clip input at sat_cutoff, and leverage the fact that for our implementation
	// expm1f(sat_cutoff) == -1.0f. The order of operands in the VMAXPS instruction matters: it ensures that NaN
	// inputs are passed unchanged.
	vx = _mm256_max_ps(vsat_cutoff, vx);

	// Compute reduced argument n := round(x / log(2), 2).
	// We do it by adding a large number (magic bias), which cause rounding of the result to 2 fractional bits, then
	// subtracing the large number back. The first addition is combined with multiplication by log2e into a single FMA
	// instruction. The trick with adding large number is valid only within certain bounds (\|x / log(2)\| <= 2**19,
	// i.e. \|x\| <= 0x1.62E43p+18 = 363408.75), but that is acceptable, because inputs x are restricted to
	// [-17.328680, 0].
	// Note that addition-subtraction of the large number doesn't cause overflow for inputs in this range.
	__m256 vn = _mm256_fmadd_ps(vx, vlog2e, vmagic_bias);

	// Create a floating-point number s (scale) such that s := 2**n for valid inputs, i.e. -17.328680 <= x <= 0.0. As n
	// has 4 fractional bits, we split s == 2n = 2int(n) * 2**frac(n). We create s in two steps:
	// 1. Fetch 2**frac(n) from the table using the 4 low bits of n, as integer. Note that the fetched values are in
	// the [1.0, 2.0) range, i.e. their floating-point exponent is 0.
	// 2. Adjust fecthed value by addition of int(n) to its floating-point exponent. The result is always a normalized
	// number, because for -17.328680 <= x <= 0.0 we have -25 <= int(n) <= 0, and thus the adjusted exponent is not
	// lower than -25.
	//
	// Shift bits 2:10 into 23:31 (position of floating-point exponent).
	const __m256i ven = _mm256_slli_epi32(_mm256_castps_si256(vn), 21);

	// Use bits 0:2 bits of n, as integer, as an index for table lookup of l := 2**frac(n).
	const __m256i vl = _mm256_castps_si256(_mm256_permutevar_ps(vtable, _mm256_castps_si256(vn)));

	// Adjust exponent of the value l fetched from the table to get the final s value.
	const __m256 vs = _mm256_castsi256_ps(_mm256_add_epi32(vl, ven));

	// Subtract the large number back to get final n := round(x / log(2), 2).
	vn = _mm256_sub_ps(vn, vmagic_bias);

	// Compute reduced argument t := x - n * log(2).
	__m256 vt = _mm256_fmadd_ps(vn, vminus_ln2, vx);

	// Compute degree-4 polynomial approximation for exp(t) - 1 on [-log(2)/16, log(2)/16].
	// P(t) = t * (1 + t * (c2 + t * (c3 + t * c4))) = t + t * (t * (c2 + t * (c3 + t * c4))) = t + t * p
	__m256 vp = _mm256_fmadd_ps(vc4, vt, vc3);
	vp = _mm256_fmadd_ps(vp, vt, vc2);
	vp = _mm256_mul_ps(vp, vt);

	// Reconstruct the exp(x) - 1 value:
	// exp(x) - 1 = s * (1 + t * (1 + t * (c2 + t * (c3 + t * c4)))) - 1
	// = (s - 1) + s * (t + t * p)
	// = ((t * s) + (t * s) * p) + (s - 1)
	vt = _mm256_mul_ps(vt, vs);
	const __m256 vsm1 = _mm256_sub_ps(vs, vone);
	vp = _mm256_fmadd_ps(vp, vt, vt);
	const __m256 vf = _mm256_add_ps(vp, vsm1);

	_mm256_storeu_ps(output, vf);

	input += 8;
	output += 8;
	}
	}