/* Double-precision vector (SVE) tanh function Copyright (C) 2024 Free Software Foundation, Inc. This file is part of the GNU C Library. The GNU C Library is free software; you can redistribute it and/or modify it under the terms of the GNU Lesser General Public License as published by the Free Software Foundation; either version 2.1 of the License, or (at your option) any later version. The GNU C Library is distributed in the hope that it will be useful, but WITHOUT ANY WARRANTY; without even the implied warranty of MERCHANTABILITY or FITNESS FOR A PARTICULAR PURPOSE. See the GNU Lesser General Public License for more details. You should have received a copy of the GNU Lesser General Public License along with the GNU C Library; if not, see . */ #include "sv_math.h" #include "poly_sve_f64.h" static const struct data { float64_t poly[11]; float64_t inv_ln2, ln2_hi, ln2_lo, shift; uint64_t thresh, tiny_bound; } data = { /* Generated using Remez, deg=12 in [-log(2)/2, log(2)/2]. */ .poly = { 0x1p-1, 0x1.5555555555559p-3, 0x1.555555555554bp-5, 0x1.111111110f663p-7, 0x1.6c16c16c1b5f3p-10, 0x1.a01a01affa35dp-13, 0x1.a01a018b4ecbbp-16, 0x1.71ddf82db5bb4p-19, 0x1.27e517fc0d54bp-22, 0x1.af5eedae67435p-26, 0x1.1f143d060a28ap-29, }, .inv_ln2 = 0x1.71547652b82fep0, .ln2_hi = -0x1.62e42fefa39efp-1, .ln2_lo = -0x1.abc9e3b39803fp-56, .shift = 0x1.8p52, .tiny_bound = 0x3e40000000000000, /* asuint64 (0x1p-27). */ /* asuint64(0x1.241bf835f9d5fp+4) - asuint64(tiny_bound). */ .thresh = 0x01f241bf835f9d5f, }; static inline svfloat64_t expm1_inline (svfloat64_t x, const svbool_t pg, const struct data *d) { /* Helper routine for calculating exp(x) - 1. Vector port of the helper from the scalar variant of tanh. */ /* Reduce argument: f in [-ln2/2, ln2/2], i is exact. */ svfloat64_t j = svsub_x (pg, svmla_x (pg, sv_f64 (d->shift), x, d->inv_ln2), d->shift); svint64_t i = svcvt_s64_x (pg, j); svfloat64_t f = svmla_x (pg, x, j, d->ln2_hi); f = svmla_x (pg, f, j, d->ln2_lo); /* Approximate expm1(f) using polynomial. */ svfloat64_t f2 = svmul_x (pg, f, f); svfloat64_t f4 = svmul_x (pg, f2, f2); svfloat64_t p = svmla_x ( pg, f, f2, sv_estrin_10_f64_x (pg, f, f2, f4, svmul_x (pg, f4, f4), d->poly)); /* t = 2 ^ i. */ svfloat64_t t = svscale_x (pg, sv_f64 (1), i); /* expm1(x) = p * t + (t - 1). */ return svmla_x (pg, svsub_x (pg, t, 1), p, t); } static svfloat64_t NOINLINE special_case (svfloat64_t x, svfloat64_t y, svbool_t special) { return sv_call_f64 (tanh, x, y, special); } /* SVE approximation for double-precision tanh(x), using a simplified version of expm1. The greatest observed error is 2.77 ULP: _ZGVsMxv_tanh(-0x1.c4a4ca0f9f3b7p-3) got -0x1.bd6a21a163627p-3 want -0x1.bd6a21a163624p-3. */ svfloat64_t SV_NAME_D1 (tanh) (svfloat64_t x, svbool_t pg) { const struct data *d = ptr_barrier (&data); svuint64_t ia = svreinterpret_u64 (svabs_x (pg, x)); /* Trigger special-cases for tiny, boring and infinity/NaN. */ svbool_t special = svcmpgt (pg, svsub_x (pg, ia, d->tiny_bound), d->thresh); svfloat64_t u = svadd_x (pg, x, x); /* tanh(x) = (e^2x - 1) / (e^2x + 1). */ svfloat64_t q = expm1_inline (u, pg, d); svfloat64_t qp2 = svadd_x (pg, q, 2); if (__glibc_unlikely (svptest_any (pg, special))) return special_case (x, svdiv_x (pg, q, qp2), special); return svdiv_x (pg, q, qp2); }