// This file is part of Eigen, a lightweight C++ template library // for linear algebra. // // Copyright (C) 2016 Pedro Gonnet (pedro.gonnet@gmail.com) // // This Source Code Form is subject to the terms of the Mozilla // Public License v. 2.0. If a copy of the MPL was not distributed // with this file, You can obtain one at http://mozilla.org/MPL/2.0/. #ifndef THIRD_PARTY_EIGEN3_EIGEN_SRC_CORE_ARCH_AVX512_MATHFUNCTIONS_H_ #define THIRD_PARTY_EIGEN3_EIGEN_SRC_CORE_ARCH_AVX512_MATHFUNCTIONS_H_ namespace Eigen { namespace internal { // Disable the code for older versions of gcc that don't support many of the required avx512 instrinsics. #if EIGEN_GNUC_AT_LEAST(5, 3) #define _EIGEN_DECLARE_CONST_Packet16f(NAME, X) \ const Packet16f p16f_##NAME = pset1(X) #define _EIGEN_DECLARE_CONST_Packet16f_FROM_INT(NAME, X) \ const Packet16f p16f_##NAME = (__m512)pset1(X) #define _EIGEN_DECLARE_CONST_Packet8d(NAME, X) \ const Packet8d p8d_##NAME = pset1(X) #define _EIGEN_DECLARE_CONST_Packet8d_FROM_INT64(NAME, X) \ const Packet8d p8d_##NAME = _mm512_castsi512_pd(_mm512_set1_epi64(X)) // Natural logarithm // Computes log(x) as log(2^e * m) = C*e + log(m), where the constant C =log(2) // and m is in the range [sqrt(1/2),sqrt(2)). In this range, the logarithm can // be easily approximated by a polynomial centered on m=1 for stability. #if defined(EIGEN_VECTORIZE_AVX512DQ) template <> EIGEN_DEFINE_FUNCTION_ALLOWING_MULTIPLE_DEFINITIONS EIGEN_UNUSED Packet16f plog(const Packet16f& _x) { Packet16f x = _x; _EIGEN_DECLARE_CONST_Packet16f(1, 1.0f); _EIGEN_DECLARE_CONST_Packet16f(half, 0.5f); _EIGEN_DECLARE_CONST_Packet16f(126f, 126.0f); _EIGEN_DECLARE_CONST_Packet16f_FROM_INT(inv_mant_mask, ~0x7f800000); // The smallest non denormalized float number. _EIGEN_DECLARE_CONST_Packet16f_FROM_INT(min_norm_pos, 0x00800000); _EIGEN_DECLARE_CONST_Packet16f_FROM_INT(minus_inf, 0xff800000); _EIGEN_DECLARE_CONST_Packet16f_FROM_INT(nan, 0x7fc00000); // Polynomial coefficients. _EIGEN_DECLARE_CONST_Packet16f(cephes_SQRTHF, 0.707106781186547524f); _EIGEN_DECLARE_CONST_Packet16f(cephes_log_p0, 7.0376836292E-2f); _EIGEN_DECLARE_CONST_Packet16f(cephes_log_p1, -1.1514610310E-1f); _EIGEN_DECLARE_CONST_Packet16f(cephes_log_p2, 1.1676998740E-1f); _EIGEN_DECLARE_CONST_Packet16f(cephes_log_p3, -1.2420140846E-1f); _EIGEN_DECLARE_CONST_Packet16f(cephes_log_p4, +1.4249322787E-1f); _EIGEN_DECLARE_CONST_Packet16f(cephes_log_p5, -1.6668057665E-1f); _EIGEN_DECLARE_CONST_Packet16f(cephes_log_p6, +2.0000714765E-1f); _EIGEN_DECLARE_CONST_Packet16f(cephes_log_p7, -2.4999993993E-1f); _EIGEN_DECLARE_CONST_Packet16f(cephes_log_p8, +3.3333331174E-1f); _EIGEN_DECLARE_CONST_Packet16f(cephes_log_q1, -2.12194440e-4f); _EIGEN_DECLARE_CONST_Packet16f(cephes_log_q2, 0.693359375f); // invalid_mask is set to true when x is NaN __mmask16 invalid_mask = _mm512_cmp_ps_mask(x, _mm512_setzero_ps(), _CMP_NGE_UQ); __mmask16 iszero_mask = _mm512_cmp_ps_mask(x, _mm512_setzero_ps(), _CMP_EQ_UQ); // Truncate input values to the minimum positive normal. x = pmax(x, p16f_min_norm_pos); // Extract the shifted exponents. Packet16f emm0 = _mm512_cvtepi32_ps(_mm512_srli_epi32((__m512i)x, 23)); Packet16f e = _mm512_sub_ps(emm0, p16f_126f); // Set the exponents to -1, i.e. x are in the range [0.5,1). x = _mm512_and_ps(x, p16f_inv_mant_mask); x = _mm512_or_ps(x, p16f_half); // part2: Shift the inputs from the range [0.5,1) to [sqrt(1/2),sqrt(2)) // and shift by -1. The values are then centered around 0, which improves // the stability of the polynomial evaluation. // if( x < SQRTHF ) { // e -= 1; // x = x + x - 1.0; // } else { x = x - 1.0; } __mmask16 mask = _mm512_cmp_ps_mask(x, p16f_cephes_SQRTHF, _CMP_LT_OQ); Packet16f tmp = _mm512_mask_blend_ps(mask, _mm512_setzero_ps(), x); x = psub(x, p16f_1); e = psub(e, _mm512_mask_blend_ps(mask, _mm512_setzero_ps(), p16f_1)); x = padd(x, tmp); Packet16f x2 = pmul(x, x); Packet16f x3 = pmul(x2, x); // Evaluate the polynomial approximant of degree 8 in three parts, probably // to improve instruction-level parallelism. Packet16f y, y1, y2; y = pmadd(p16f_cephes_log_p0, x, p16f_cephes_log_p1); y1 = pmadd(p16f_cephes_log_p3, x, p16f_cephes_log_p4); y2 = pmadd(p16f_cephes_log_p6, x, p16f_cephes_log_p7); y = pmadd(y, x, p16f_cephes_log_p2); y1 = pmadd(y1, x, p16f_cephes_log_p5); y2 = pmadd(y2, x, p16f_cephes_log_p8); y = pmadd(y, x3, y1); y = pmadd(y, x3, y2); y = pmul(y, x3); // Add the logarithm of the exponent back to the result of the interpolation. y1 = pmul(e, p16f_cephes_log_q1); tmp = pmul(x2, p16f_half); y = padd(y, y1); x = psub(x, tmp); y2 = pmul(e, p16f_cephes_log_q2); x = padd(x, y); x = padd(x, y2); // Filter out invalid inputs, i.e. negative arg will be NAN, 0 will be -INF. return _mm512_mask_blend_ps(iszero_mask, _mm512_mask_blend_ps(invalid_mask, x, p16f_nan), p16f_minus_inf); } #endif // Exponential function. Works by writing "x = m*log(2) + r" where // "m = floor(x/log(2)+1/2)" and "r" is the remainder. The result is then // "exp(x) = 2^m*exp(r)" where exp(r) is in the range [-1,1). template <> EIGEN_DEFINE_FUNCTION_ALLOWING_MULTIPLE_DEFINITIONS EIGEN_UNUSED Packet16f pexp(const Packet16f& _x) { _EIGEN_DECLARE_CONST_Packet16f(1, 1.0f); _EIGEN_DECLARE_CONST_Packet16f(half, 0.5f); _EIGEN_DECLARE_CONST_Packet16f(127, 127.0f); _EIGEN_DECLARE_CONST_Packet16f(exp_hi, 88.3762626647950f); _EIGEN_DECLARE_CONST_Packet16f(exp_lo, -88.3762626647949f); _EIGEN_DECLARE_CONST_Packet16f(cephes_LOG2EF, 1.44269504088896341f); _EIGEN_DECLARE_CONST_Packet16f(cephes_exp_p0, 1.9875691500E-4f); _EIGEN_DECLARE_CONST_Packet16f(cephes_exp_p1, 1.3981999507E-3f); _EIGEN_DECLARE_CONST_Packet16f(cephes_exp_p2, 8.3334519073E-3f); _EIGEN_DECLARE_CONST_Packet16f(cephes_exp_p3, 4.1665795894E-2f); _EIGEN_DECLARE_CONST_Packet16f(cephes_exp_p4, 1.6666665459E-1f); _EIGEN_DECLARE_CONST_Packet16f(cephes_exp_p5, 5.0000001201E-1f); // Clamp x. Packet16f x = pmax(pmin(_x, p16f_exp_hi), p16f_exp_lo); // Express exp(x) as exp(m*ln(2) + r), start by extracting // m = floor(x/ln(2) + 0.5). Packet16f m = _mm512_floor_ps(pmadd(x, p16f_cephes_LOG2EF, p16f_half)); // Get r = x - m*ln(2). Note that we can do this without losing more than one // ulp precision due to the FMA instruction. _EIGEN_DECLARE_CONST_Packet16f(nln2, -0.6931471805599453f); Packet16f r = _mm512_fmadd_ps(m, p16f_nln2, x); Packet16f r2 = pmul(r, r); // TODO(gonnet): Split into odd/even polynomials and try to exploit // instruction-level parallelism. Packet16f y = p16f_cephes_exp_p0; y = pmadd(y, r, p16f_cephes_exp_p1); y = pmadd(y, r, p16f_cephes_exp_p2); y = pmadd(y, r, p16f_cephes_exp_p3); y = pmadd(y, r, p16f_cephes_exp_p4); y = pmadd(y, r, p16f_cephes_exp_p5); y = pmadd(y, r2, r); y = padd(y, p16f_1); // Build emm0 = 2^m. Packet16i emm0 = _mm512_cvttps_epi32(padd(m, p16f_127)); emm0 = _mm512_slli_epi32(emm0, 23); // Return 2^m * exp(r). return pmax(pmul(y, _mm512_castsi512_ps(emm0)), _x); } /*template <> EIGEN_DEFINE_FUNCTION_ALLOWING_MULTIPLE_DEFINITIONS EIGEN_UNUSED Packet8d pexp(const Packet8d& _x) { Packet8d x = _x; _EIGEN_DECLARE_CONST_Packet8d(1, 1.0); _EIGEN_DECLARE_CONST_Packet8d(2, 2.0); _EIGEN_DECLARE_CONST_Packet8d(exp_hi, 709.437); _EIGEN_DECLARE_CONST_Packet8d(exp_lo, -709.436139303); _EIGEN_DECLARE_CONST_Packet8d(cephes_LOG2EF, 1.4426950408889634073599); _EIGEN_DECLARE_CONST_Packet8d(cephes_exp_p0, 1.26177193074810590878e-4); _EIGEN_DECLARE_CONST_Packet8d(cephes_exp_p1, 3.02994407707441961300e-2); _EIGEN_DECLARE_CONST_Packet8d(cephes_exp_p2, 9.99999999999999999910e-1); _EIGEN_DECLARE_CONST_Packet8d(cephes_exp_q0, 3.00198505138664455042e-6); _EIGEN_DECLARE_CONST_Packet8d(cephes_exp_q1, 2.52448340349684104192e-3); _EIGEN_DECLARE_CONST_Packet8d(cephes_exp_q2, 2.27265548208155028766e-1); _EIGEN_DECLARE_CONST_Packet8d(cephes_exp_q3, 2.00000000000000000009e0); _EIGEN_DECLARE_CONST_Packet8d(cephes_exp_C1, 0.693145751953125); _EIGEN_DECLARE_CONST_Packet8d(cephes_exp_C2, 1.42860682030941723212e-6); // clamp x x = pmax(pmin(x, p8d_exp_hi), p8d_exp_lo); // Express exp(x) as exp(g + n*log(2)). const Packet8d n = _mm512_mul_round_pd(p8d_cephes_LOG2EF, x, _MM_FROUND_TO_NEAREST_INT); // Get the remainder modulo log(2), i.e. the "g" described above. Subtract // n*log(2) out in two steps, i.e. n*C1 + n*C2, C1+C2=log2 to get the last // digits right. const Packet8d nC1 = pmul(n, p8d_cephes_exp_C1); const Packet8d nC2 = pmul(n, p8d_cephes_exp_C2); x = psub(x, nC1); x = psub(x, nC2); const Packet8d x2 = pmul(x, x); // Evaluate the numerator polynomial of the rational interpolant. Packet8d px = p8d_cephes_exp_p0; px = pmadd(px, x2, p8d_cephes_exp_p1); px = pmadd(px, x2, p8d_cephes_exp_p2); px = pmul(px, x); // Evaluate the denominator polynomial of the rational interpolant. Packet8d qx = p8d_cephes_exp_q0; qx = pmadd(qx, x2, p8d_cephes_exp_q1); qx = pmadd(qx, x2, p8d_cephes_exp_q2); qx = pmadd(qx, x2, p8d_cephes_exp_q3); // I don't really get this bit, copied from the SSE2 routines, so... // TODO(gonnet): Figure out what is going on here, perhaps find a better // rational interpolant? x = _mm512_div_pd(px, psub(qx, px)); x = pmadd(p8d_2, x, p8d_1); // Build e=2^n. const Packet8d e = _mm512_castsi512_pd(_mm512_slli_epi64( _mm512_add_epi64(_mm512_cvtpd_epi64(n), _mm512_set1_epi64(1023)), 52)); // Construct the result 2^n * exp(g) = e * x. The max is used to catch // non-finite values in the input. return pmax(pmul(x, e), _x); }*/ // Functions for sqrt. // The EIGEN_FAST_MATH version uses the _mm_rsqrt_ps approximation and one step // of Newton's method, at a cost of 1-2 bits of precision as opposed to the // exact solution. The main advantage of this approach is not just speed, but // also the fact that it can be inlined and pipelined with other computations, // further reducing its effective latency. #if EIGEN_FAST_MATH template <> EIGEN_DEFINE_FUNCTION_ALLOWING_MULTIPLE_DEFINITIONS EIGEN_UNUSED Packet16f psqrt(const Packet16f& _x) { _EIGEN_DECLARE_CONST_Packet16f(one_point_five, 1.5f); _EIGEN_DECLARE_CONST_Packet16f(minus_half, -0.5f); _EIGEN_DECLARE_CONST_Packet16f_FROM_INT(flt_min, 0x00800000); Packet16f neg_half = pmul(_x, p16f_minus_half); // select only the inverse sqrt of positive normal inputs (denormals are // flushed to zero and cause infs as well). __mmask16 non_zero_mask = _mm512_cmp_ps_mask(_x, p16f_flt_min, _CMP_GE_OQ); Packet16f x = _mm512_mask_blend_ps(non_zero_mask, _mm512_setzero_ps(), _mm512_rsqrt14_ps(_x)); // Do a single step of Newton's iteration. x = pmul(x, pmadd(neg_half, pmul(x, x), p16f_one_point_five)); // Multiply the original _x by it's reciprocal square root to extract the // square root. return pmul(_x, x); } template <> EIGEN_DEFINE_FUNCTION_ALLOWING_MULTIPLE_DEFINITIONS EIGEN_UNUSED Packet8d psqrt(const Packet8d& _x) { _EIGEN_DECLARE_CONST_Packet8d(one_point_five, 1.5); _EIGEN_DECLARE_CONST_Packet8d(minus_half, -0.5); _EIGEN_DECLARE_CONST_Packet8d_FROM_INT64(dbl_min, 0x0010000000000000LL); Packet8d neg_half = pmul(_x, p8d_minus_half); // select only the inverse sqrt of positive normal inputs (denormals are // flushed to zero and cause infs as well). __mmask8 non_zero_mask = _mm512_cmp_pd_mask(_x, p8d_dbl_min, _CMP_GE_OQ); Packet8d x = _mm512_mask_blend_pd(non_zero_mask, _mm512_setzero_pd(), _mm512_rsqrt14_pd(_x)); // Do a first step of Newton's iteration. x = pmul(x, pmadd(neg_half, pmul(x, x), p8d_one_point_five)); // Do a second step of Newton's iteration. x = pmul(x, pmadd(neg_half, pmul(x, x), p8d_one_point_five)); // Multiply the original _x by it's reciprocal square root to extract the // square root. return pmul(_x, x); } #else template <> EIGEN_STRONG_INLINE Packet16f psqrt(const Packet16f& x) { return _mm512_sqrt_ps(x); } template <> EIGEN_STRONG_INLINE Packet8d psqrt(const Packet8d& x) { return _mm512_sqrt_pd(x); } #endif // Functions for rsqrt. // Almost identical to the sqrt routine, just leave out the last multiplication // and fill in NaN/Inf where needed. Note that this function only exists as an // iterative version for doubles since there is no instruction for diretly // computing the reciprocal square root in AVX-512. #ifdef EIGEN_FAST_MATH template <> EIGEN_DEFINE_FUNCTION_ALLOWING_MULTIPLE_DEFINITIONS EIGEN_UNUSED Packet16f prsqrt(const Packet16f& _x) { _EIGEN_DECLARE_CONST_Packet16f_FROM_INT(inf, 0x7f800000); _EIGEN_DECLARE_CONST_Packet16f_FROM_INT(nan, 0x7fc00000); _EIGEN_DECLARE_CONST_Packet16f(one_point_five, 1.5f); _EIGEN_DECLARE_CONST_Packet16f(minus_half, -0.5f); _EIGEN_DECLARE_CONST_Packet16f_FROM_INT(flt_min, 0x00800000); Packet16f neg_half = pmul(_x, p16f_minus_half); // select only the inverse sqrt of positive normal inputs (denormals are // flushed to zero and cause infs as well). __mmask16 le_zero_mask = _mm512_cmp_ps_mask(_x, p16f_flt_min, _CMP_LT_OQ); Packet16f x = _mm512_mask_blend_ps(le_zero_mask, _mm512_rsqrt14_ps(_x), _mm512_setzero_ps()); // Fill in NaNs and Infs for the negative/zero entries. __mmask16 neg_mask = _mm512_cmp_ps_mask(_x, _mm512_setzero_ps(), _CMP_LT_OQ); Packet16f infs_and_nans = _mm512_mask_blend_ps( neg_mask, _mm512_mask_blend_ps(le_zero_mask, _mm512_setzero_ps(), p16f_inf), p16f_nan); // Do a single step of Newton's iteration. x = pmul(x, pmadd(neg_half, pmul(x, x), p16f_one_point_five)); // Insert NaNs and Infs in all the right places. return _mm512_mask_blend_ps(le_zero_mask, x, infs_and_nans); } template <> EIGEN_DEFINE_FUNCTION_ALLOWING_MULTIPLE_DEFINITIONS EIGEN_UNUSED Packet8d prsqrt(const Packet8d& _x) { _EIGEN_DECLARE_CONST_Packet8d_FROM_INT64(inf, 0x7ff0000000000000LL); _EIGEN_DECLARE_CONST_Packet8d_FROM_INT64(nan, 0x7ff1000000000000LL); _EIGEN_DECLARE_CONST_Packet8d(one_point_five, 1.5); _EIGEN_DECLARE_CONST_Packet8d(minus_half, -0.5); _EIGEN_DECLARE_CONST_Packet8d_FROM_INT64(dbl_min, 0x0010000000000000LL); Packet8d neg_half = pmul(_x, p8d_minus_half); // select only the inverse sqrt of positive normal inputs (denormals are // flushed to zero and cause infs as well). __mmask8 le_zero_mask = _mm512_cmp_pd_mask(_x, p8d_dbl_min, _CMP_LT_OQ); Packet8d x = _mm512_mask_blend_pd(le_zero_mask, _mm512_rsqrt14_pd(_x), _mm512_setzero_pd()); // Fill in NaNs and Infs for the negative/zero entries. __mmask8 neg_mask = _mm512_cmp_pd_mask(_x, _mm512_setzero_pd(), _CMP_LT_OQ); Packet8d infs_and_nans = _mm512_mask_blend_pd( neg_mask, _mm512_mask_blend_pd(le_zero_mask, _mm512_setzero_pd(), p8d_inf), p8d_nan); // Do a first step of Newton's iteration. x = pmul(x, pmadd(neg_half, pmul(x, x), p8d_one_point_five)); // Do a second step of Newton's iteration. x = pmul(x, pmadd(neg_half, pmul(x, x), p8d_one_point_five)); // Insert NaNs and Infs in all the right places. return _mm512_mask_blend_pd(le_zero_mask, x, infs_and_nans); } #elif defined(EIGEN_VECTORIZE_AVX512ER) template <> EIGEN_STRONG_INLINE Packet16f prsqrt(const Packet16f& x) { return _mm512_rsqrt28_ps(x); } #endif #endif } // end namespace internal } // end namespace Eigen #endif // THIRD_PARTY_EIGEN3_EIGEN_SRC_CORE_ARCH_AVX512_MATHFUNCTIONS_H_