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105 lines
4.2 KiB
C
105 lines
4.2 KiB
C
/* Double-precision AdvSIMD inverse tan
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Copyright (C) 2023-2024 Free Software Foundation, Inc.
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This file is part of the GNU C Library.
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The GNU C Library is free software; you can redistribute it and/or
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modify it under the terms of the GNU Lesser General Public
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License as published by the Free Software Foundation; either
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version 2.1 of the License, or (at your option) any later version.
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The GNU C Library is distributed in the hope that it will be useful,
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but WITHOUT ANY WARRANTY; without even the implied warranty of
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MERCHANTABILITY or FITNESS FOR A PARTICULAR PURPOSE. See the GNU
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Lesser General Public License for more details.
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You should have received a copy of the GNU Lesser General Public
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License along with the GNU C Library; if not, see
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<https://www.gnu.org/licenses/>. */
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#include "v_math.h"
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#include "poly_advsimd_f64.h"
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static const struct data
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{
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float64x2_t pi_over_2;
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float64x2_t poly[20];
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} data = {
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/* Coefficients of polynomial P such that atan(x)~x+x*P(x^2) on
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[2**-1022, 1.0]. */
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.poly = { V2 (-0x1.5555555555555p-2), V2 (0x1.99999999996c1p-3),
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V2 (-0x1.2492492478f88p-3), V2 (0x1.c71c71bc3951cp-4),
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V2 (-0x1.745d160a7e368p-4), V2 (0x1.3b139b6a88ba1p-4),
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V2 (-0x1.11100ee084227p-4), V2 (0x1.e1d0f9696f63bp-5),
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V2 (-0x1.aebfe7b418581p-5), V2 (0x1.842dbe9b0d916p-5),
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V2 (-0x1.5d30140ae5e99p-5), V2 (0x1.338e31eb2fbbcp-5),
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V2 (-0x1.00e6eece7de8p-5), V2 (0x1.860897b29e5efp-6),
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V2 (-0x1.0051381722a59p-6), V2 (0x1.14e9dc19a4a4ep-7),
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V2 (-0x1.d0062b42fe3bfp-9), V2 (0x1.17739e210171ap-10),
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V2 (-0x1.ab24da7be7402p-13), V2 (0x1.358851160a528p-16), },
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.pi_over_2 = V2 (0x1.921fb54442d18p+0),
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};
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#define SignMask v_u64 (0x8000000000000000)
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#define TinyBound 0x3e10000000000000 /* asuint64(0x1p-30). */
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#define BigBound 0x4340000000000000 /* asuint64(0x1p53). */
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/* Fast implementation of vector atan.
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Based on atan(x) ~ shift + z + z^3 * P(z^2) with reduction to [0,1] using
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z=1/x and shift = pi/2. Maximum observed error is 2.27 ulps:
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_ZGVnN2v_atan (0x1.0005af27c23e9p+0) got 0x1.9225645bdd7c1p-1
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want 0x1.9225645bdd7c3p-1. */
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float64x2_t VPCS_ATTR V_NAME_D1 (atan) (float64x2_t x)
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{
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const struct data *d = ptr_barrier (&data);
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/* Small cases, infs and nans are supported by our approximation technique,
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but do not set fenv flags correctly. Only trigger special case if we need
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fenv. */
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uint64x2_t ix = vreinterpretq_u64_f64 (x);
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uint64x2_t sign = vandq_u64 (ix, SignMask);
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#if WANT_SIMD_EXCEPT
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uint64x2_t ia12 = vandq_u64 (ix, v_u64 (0x7ff0000000000000));
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uint64x2_t special = vcgtq_u64 (vsubq_u64 (ia12, v_u64 (TinyBound)),
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v_u64 (BigBound - TinyBound));
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/* If any lane is special, fall back to the scalar routine for all lanes. */
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if (__glibc_unlikely (v_any_u64 (special)))
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return v_call_f64 (atan, x, v_f64 (0), v_u64 (-1));
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#endif
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/* Argument reduction:
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y := arctan(x) for x < 1
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y := pi/2 + arctan(-1/x) for x > 1
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Hence, use z=-1/a if x>=1, otherwise z=a. */
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uint64x2_t red = vcagtq_f64 (x, v_f64 (1.0));
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/* Avoid dependency in abs(x) in division (and comparison). */
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float64x2_t z = vbslq_f64 (red, vdivq_f64 (v_f64 (1.0), x), x);
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float64x2_t shift = vreinterpretq_f64_u64 (
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vandq_u64 (red, vreinterpretq_u64_f64 (d->pi_over_2)));
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/* Use absolute value only when needed (odd powers of z). */
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float64x2_t az = vbslq_f64 (
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SignMask, vreinterpretq_f64_u64 (vandq_u64 (SignMask, red)), z);
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/* Calculate the polynomial approximation.
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Use split Estrin scheme for P(z^2) with deg(P)=19. Use split instead of
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full scheme to avoid underflow in x^16.
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The order 19 polynomial P approximates
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(atan(sqrt(x))-sqrt(x))/x^(3/2). */
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float64x2_t z2 = vmulq_f64 (z, z);
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float64x2_t x2 = vmulq_f64 (z2, z2);
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float64x2_t x4 = vmulq_f64 (x2, x2);
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float64x2_t x8 = vmulq_f64 (x4, x4);
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float64x2_t y
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= vfmaq_f64 (v_estrin_7_f64 (z2, x2, x4, d->poly),
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v_estrin_11_f64 (z2, x2, x4, x8, d->poly + 8), x8);
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/* Finalize. y = shift + z + z^3 * P(z^2). */
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y = vfmaq_f64 (az, y, vmulq_f64 (z2, az));
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y = vaddq_f64 (y, shift);
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/* y = atan(x) if x>0, -atan(-x) otherwise. */
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y = vreinterpretq_f64_u64 (veorq_u64 (vreinterpretq_u64_f64 (y), sign));
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return y;
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}
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