776 lines
24 KiB
C
776 lines
24 KiB
C
/**********************************************************************
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Audacity: A Digital Audio Editor
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SseMathFuncs.h
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Stephen Moshier (wrote original C version, The Cephes Library)
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Julien Pommier (converted to use SSE)
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Andrew Hallendorff (adapted for Audacity)
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*******************************************************************//**
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\file SseMathfuncs.h
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\brief SSE maths functions (for FFTs)
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*//****************************************************************/
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/* JKC: The trig functions use Taylor's series, on the range 0 to Pi/4
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* computing both Sin and Cos, and using one or the other (in the
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* solo functions), or both in the more useful for us for FFTs sincos
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* function.
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* The constants minus_cephes_DP1 to minus_cephes_DP3 are used in the
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* angle reduction modulo function.
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* 4 sincos are done at a time.
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* If we wanted to do just sin or just cos, we could speed things up
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* by queuing up the Sines and Cosines into batches of 4 separately.*/
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/* SIMD (SSE1+MMX or SSE2) implementation of sin, cos, exp and log
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Inspired by Intel Approximate Math library, and based on the
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corresponding algorithms of the cephes math library
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The default is to use the SSE1 version. If you define USE_SSE2 the
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the SSE2 intrinsics will be used in place of the MMX intrinsics. Do
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not expect any significant performance improvement with SSE2.
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*/
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/* Copyright (C) 2007 Julien Pommier
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This software is provided 'as-is', without any express or implied
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warranty. In no event will the authors be held liable for any damages
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arising from the use of this software.
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Permission is granted to anyone to use this software for any purpose,
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including commercial applications, and to alter it and redistribute it
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freely, subject to the following restrictions:
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1. The origin of this software must not be misrepresented; you must not
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claim that you wrote the original software. If you use this software
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in a product, an acknowledgment in the product documentation would be
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appreciated but is not required.
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2. Altered source versions must be plainly marked as such, and must not be
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misrepresented as being the original software.
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3. This notice may not be removed or altered from any source distribution.
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(this is the zlib license)
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*/
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#ifndef SSE_MATHFUN
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#define SSE_MATHFUN
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/* SIMD (SSE1+MMX or SSE2) implementation of sin, cos, exp and log
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Inspired by Intel Approximate Math library, and based on the
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corresponding algorithms of the cephes math library
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The default is to use the SSE1 version. If you define USE_SSE2 the
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the SSE2 intrinsics will be used in place of the MMX intrinsics. Do
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not expect any significant performance improvement with SSE2.
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*/
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/* Copyright (C) 2007 Julien Pommier
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This software is provided 'as-is', without any express or implied
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warranty. In no event will the authors be held liable for any damages
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arising from the use of this software.
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Permission is granted to anyone to use this software for any purpose,
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including commercial applications, and to alter it and redistribute it
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freely, subject to the following restrictions:
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1. The origin of this software must not be misrepresented; you must not
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claim that you wrote the original software. If you use this software
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in a product, an acknowledgment in the product documentation would be
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appreciated but is not required.
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2. Altered source versions must be plainly marked as such, and must not be
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misrepresented as being the original software.
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3. This notice may not be removed or altered from any source distribution.
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(this is the zlib license)
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*/
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#include <xmmintrin.h>
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/* yes I know, the top of this file is quite ugly */
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#ifdef _MSC_VER /* visual c++ */
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# define ALIGN16_BEG __declspec(align(16))
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# define ALIGN16_END
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#else /* gcc or icc */
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# define ALIGN16_BEG
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# define ALIGN16_END __attribute__((aligned(16)))
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#endif
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/* __m128 is ugly to write */
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typedef __m128 v4sf; // vector of 4 float (sse1)
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#ifdef USE_SSE2
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# include <emmintrin.h>
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typedef __m128i v4si; // vector of 4 int (sse2)
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#else
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typedef __m64 v2si; // vector of 2 int (mmx)
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#endif
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/* declare some SSE constants -- why can't I figure a better way to do that? */
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#define _PS_CONST(Name, Val) \
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static const ALIGN16_BEG float _ps_##Name[4] ALIGN16_END = { Val, Val, Val, Val }
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#define _PI32_CONST(Name, Val) \
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static const ALIGN16_BEG int _pi32_##Name[4] ALIGN16_END = { Val, Val, Val, Val }
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#define _PS_CONST_TYPE(Name, Type, Val) \
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static const ALIGN16_BEG Type _ps_##Name[4] ALIGN16_END = { Val, Val, Val, Val }
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_PS_CONST(1 , 1.0f);
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_PS_CONST(0p5, 0.5f);
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/* the smallest non denormalized float number */
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_PS_CONST_TYPE(min_norm_pos, int, 0x00800000);
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_PS_CONST_TYPE(mant_mask, int, 0x7f800000);
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_PS_CONST_TYPE(inv_mant_mask, int, ~0x7f800000);
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_PS_CONST_TYPE(sign_mask, int, (int)0x80000000);
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_PS_CONST_TYPE(inv_sign_mask, int, ~0x80000000);
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_PI32_CONST(1, 1);
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_PI32_CONST(inv1, ~1);
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_PI32_CONST(2, 2);
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_PI32_CONST(4, 4);
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_PI32_CONST(0x7f, 0x7f);
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_PS_CONST(cephes_SQRTHF, 0.707106781186547524);
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_PS_CONST(cephes_log_p0, 7.0376836292E-2);
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_PS_CONST(cephes_log_p1, - 1.1514610310E-1);
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_PS_CONST(cephes_log_p2, 1.1676998740E-1);
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_PS_CONST(cephes_log_p3, - 1.2420140846E-1);
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_PS_CONST(cephes_log_p4, + 1.4249322787E-1);
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_PS_CONST(cephes_log_p5, - 1.6668057665E-1);
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_PS_CONST(cephes_log_p6, + 2.0000714765E-1);
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_PS_CONST(cephes_log_p7, - 2.4999993993E-1);
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_PS_CONST(cephes_log_p8, + 3.3333331174E-1);
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_PS_CONST(cephes_log_q1, -2.12194440e-4);
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_PS_CONST(cephes_log_q2, 0.693359375);
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#ifndef USE_SSE2
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typedef union xmm_mm_union {
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__m128 xmm;
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__m64 mm[2];
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} xmm_mm_union;
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#define COPY_XMM_TO_MM(xmm_, mm0_, mm1_) { \
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xmm_mm_union u; u.xmm = xmm_; \
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mm0_ = u.mm[0]; \
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mm1_ = u.mm[1]; \
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}
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#define COPY_MM_TO_XMM(mm0_, mm1_, xmm_) { \
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xmm_mm_union u; u.mm[0]=mm0_; u.mm[1]=mm1_; xmm_ = u.xmm; \
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}
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#endif // USE_SSE2
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/* natural logarithm computed for 4 simultaneous float
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return NaN for x <= 0
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*/
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v4sf log_ps(v4sf x) {
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#ifdef USE_SSE2
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v4si emm0;
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#else
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v2si mm0, mm1;
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#endif
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v4sf one = *(v4sf*)_ps_1;
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v4sf invalid_mask = _mm_cmple_ps(x, _mm_setzero_ps());
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x = _mm_max_ps(x, *(v4sf*)_ps_min_norm_pos); /* cut off denormalized stuff */
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#ifndef USE_SSE2
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/* part 1: x = frexpf(x, &e); */
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COPY_XMM_TO_MM(x, mm0, mm1);
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mm0 = _mm_srli_pi32(mm0, 23);
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mm1 = _mm_srli_pi32(mm1, 23);
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#else
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emm0 = _mm_srli_epi32(_mm_castps_si128(x), 23);
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#endif
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/* keep only the fractional part */
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x = _mm_and_ps(x, *(v4sf*)_ps_inv_mant_mask);
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x = _mm_or_ps(x, *(v4sf*)_ps_0p5);
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#ifndef USE_SSE2
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/* now e=mm0:mm1 contain the really base-2 exponent */
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mm0 = _mm_sub_pi32(mm0, *(v2si*)_pi32_0x7f);
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mm1 = _mm_sub_pi32(mm1, *(v2si*)_pi32_0x7f);
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v4sf e = _mm_cvtpi32x2_ps(mm0, mm1);
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_mm_empty(); /* bye bye mmx */
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#else
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emm0 = _mm_sub_epi32(emm0, *(v4si*)_pi32_0x7f);
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v4sf e = _mm_cvtepi32_ps(emm0);
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#endif
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e = _mm_add_ps(e, one);
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/* part2:
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if( x < SQRTHF ) {
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e -= 1;
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x = x + x - 1.0;
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} else { x = x - 1.0; }
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*/
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v4sf mask = _mm_cmplt_ps(x, *(v4sf*)_ps_cephes_SQRTHF);
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v4sf tmp = _mm_and_ps(x, mask);
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x = _mm_sub_ps(x, one);
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e = _mm_sub_ps(e, _mm_and_ps(one, mask));
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x = _mm_add_ps(x, tmp);
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v4sf z = _mm_mul_ps(x,x);
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v4sf y = *(v4sf*)_ps_cephes_log_p0;
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y = _mm_mul_ps(y, x);
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y = _mm_add_ps(y, *(v4sf*)_ps_cephes_log_p1);
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y = _mm_mul_ps(y, x);
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y = _mm_add_ps(y, *(v4sf*)_ps_cephes_log_p2);
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y = _mm_mul_ps(y, x);
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y = _mm_add_ps(y, *(v4sf*)_ps_cephes_log_p3);
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y = _mm_mul_ps(y, x);
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y = _mm_add_ps(y, *(v4sf*)_ps_cephes_log_p4);
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y = _mm_mul_ps(y, x);
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y = _mm_add_ps(y, *(v4sf*)_ps_cephes_log_p5);
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y = _mm_mul_ps(y, x);
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y = _mm_add_ps(y, *(v4sf*)_ps_cephes_log_p6);
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y = _mm_mul_ps(y, x);
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y = _mm_add_ps(y, *(v4sf*)_ps_cephes_log_p7);
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y = _mm_mul_ps(y, x);
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y = _mm_add_ps(y, *(v4sf*)_ps_cephes_log_p8);
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y = _mm_mul_ps(y, x);
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y = _mm_mul_ps(y, z);
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tmp = _mm_mul_ps(e, *(v4sf*)_ps_cephes_log_q1);
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y = _mm_add_ps(y, tmp);
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tmp = _mm_mul_ps(z, *(v4sf*)_ps_0p5);
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y = _mm_sub_ps(y, tmp);
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tmp = _mm_mul_ps(e, *(v4sf*)_ps_cephes_log_q2);
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x = _mm_add_ps(x, y);
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x = _mm_add_ps(x, tmp);
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x = _mm_or_ps(x, invalid_mask); // negative arg will be NAN
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return x;
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}
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_PS_CONST(exp_hi, 88.3762626647949f);
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_PS_CONST(exp_lo, -88.3762626647949f);
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_PS_CONST(cephes_LOG2EF, 1.44269504088896341);
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_PS_CONST(cephes_exp_C1, 0.693359375);
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_PS_CONST(cephes_exp_C2, -2.12194440e-4);
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_PS_CONST(cephes_exp_p0, 1.9875691500E-4);
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_PS_CONST(cephes_exp_p1, 1.3981999507E-3);
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_PS_CONST(cephes_exp_p2, 8.3334519073E-3);
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_PS_CONST(cephes_exp_p3, 4.1665795894E-2);
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_PS_CONST(cephes_exp_p4, 1.6666665459E-1);
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_PS_CONST(cephes_exp_p5, 5.0000001201E-1);
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v4sf exp_ps(v4sf x) {
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v4sf tmp = _mm_setzero_ps(), fx;
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#ifdef USE_SSE2
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v4si emm0;
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#else
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v2si mm0, mm1;
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#endif
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v4sf one = *(v4sf*)_ps_1;
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x = _mm_min_ps(x, *(v4sf*)_ps_exp_hi);
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x = _mm_max_ps(x, *(v4sf*)_ps_exp_lo);
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/* express exp(x) as exp(g + n*log(2)) */
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fx = _mm_mul_ps(x, *(v4sf*)_ps_cephes_LOG2EF);
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fx = _mm_add_ps(fx, *(v4sf*)_ps_0p5);
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/* how to perform a floorf with SSE: just below */
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#ifndef USE_SSE2
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/* step 1 : cast to int */
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tmp = _mm_movehl_ps(tmp, fx);
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mm0 = _mm_cvttps_pi32(fx);
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mm1 = _mm_cvttps_pi32(tmp);
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/* step 2 : cast back to float */
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tmp = _mm_cvtpi32x2_ps(mm0, mm1);
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#else
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emm0 = _mm_cvttps_epi32(fx);
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tmp = _mm_cvtepi32_ps(emm0);
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#endif
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/* if greater, subtract 1 */
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v4sf mask = _mm_cmpgt_ps(tmp, fx);
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mask = _mm_and_ps(mask, one);
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fx = _mm_sub_ps(tmp, mask);
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tmp = _mm_mul_ps(fx, *(v4sf*)_ps_cephes_exp_C1);
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v4sf z = _mm_mul_ps(fx, *(v4sf*)_ps_cephes_exp_C2);
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x = _mm_sub_ps(x, tmp);
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x = _mm_sub_ps(x, z);
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z = _mm_mul_ps(x,x);
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v4sf y = *(v4sf*)_ps_cephes_exp_p0;
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y = _mm_mul_ps(y, x);
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y = _mm_add_ps(y, *(v4sf*)_ps_cephes_exp_p1);
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y = _mm_mul_ps(y, x);
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y = _mm_add_ps(y, *(v4sf*)_ps_cephes_exp_p2);
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y = _mm_mul_ps(y, x);
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y = _mm_add_ps(y, *(v4sf*)_ps_cephes_exp_p3);
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y = _mm_mul_ps(y, x);
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y = _mm_add_ps(y, *(v4sf*)_ps_cephes_exp_p4);
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y = _mm_mul_ps(y, x);
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y = _mm_add_ps(y, *(v4sf*)_ps_cephes_exp_p5);
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y = _mm_mul_ps(y, z);
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y = _mm_add_ps(y, x);
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y = _mm_add_ps(y, one);
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/* build 2^n */
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#ifndef USE_SSE2
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z = _mm_movehl_ps(z, fx);
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mm0 = _mm_cvttps_pi32(fx);
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mm1 = _mm_cvttps_pi32(z);
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mm0 = _mm_add_pi32(mm0, *(v2si*)_pi32_0x7f);
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mm1 = _mm_add_pi32(mm1, *(v2si*)_pi32_0x7f);
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mm0 = _mm_slli_pi32(mm0, 23);
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mm1 = _mm_slli_pi32(mm1, 23);
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v4sf pow2n;
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COPY_MM_TO_XMM(mm0, mm1, pow2n);
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_mm_empty();
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#else
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emm0 = _mm_cvttps_epi32(fx);
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emm0 = _mm_add_epi32(emm0, *(v4si*)_pi32_0x7f);
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emm0 = _mm_slli_epi32(emm0, 23);
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v4sf pow2n = _mm_castsi128_ps(emm0);
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#endif
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y = _mm_mul_ps(y, pow2n);
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return y;
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}
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_PS_CONST(minus_cephes_DP1, -0.78515625);
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_PS_CONST(minus_cephes_DP2, -2.4187564849853515625e-4);
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_PS_CONST(minus_cephes_DP3, -3.77489497744594108e-8);
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_PS_CONST(sincof_p0, -1.9515295891E-4);
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_PS_CONST(sincof_p1, 8.3321608736E-3);
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_PS_CONST(sincof_p2, -1.6666654611E-1);
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_PS_CONST(coscof_p0, 2.443315711809948E-005);
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_PS_CONST(coscof_p1, -1.388731625493765E-003);
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_PS_CONST(coscof_p2, 4.166664568298827E-002);
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_PS_CONST(cephes_FOPI, 1.27323954473516); // 4 / M_PI
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/* evaluation of 4 sines at once, using only SSE1+MMX intrinsics so
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it runs also on old athlons XPs and the pentium III of your grand
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mother.
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The code is the exact rewriting of the cephes sinf function.
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Precision is excellent as long as x < 8192 (I did not bother to
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take into account the special handling they have for greater values
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-- it does not return garbage for arguments over 8192, though, but
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the extra precision is missing).
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Note that it is such that sinf((float)M_PI) = 8.74e-8, which is the
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surprising but correct result.
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Performance is also surprisingly good, 1.33 times faster than the
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macos vsinf SSE2 function, and 1.5 times faster than the
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__vrs4_sinf of amd's ACML (which is only available in 64 bits). Not
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too bad for an SSE1 function (with no special tuning) !
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However the latter libraries probably have a much better handling of NaN,
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Inf, denormalized and other special arguments..
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On my core 1 duo, the execution of this function takes approximately 95 cycles.
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From what I have observed on the experiments with Intel AMath lib, switching to an
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SSE2 version would improve the perf by only 10%.
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Since it is based on SSE intrinsics, it has to be compiled at -O2 to
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deliver full speed.
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*/
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v4sf sin_ps(v4sf x) { // any x
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v4sf xmm1, xmm2 = _mm_setzero_ps(), xmm3, sign_bit, y;
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#ifdef USE_SSE2
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v4si emm0, emm2;
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#else
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v2si mm0, mm1, mm2, mm3;
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#endif
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sign_bit = x;
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/* take the absolute value */
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x = _mm_and_ps(x, *(v4sf*)_ps_inv_sign_mask);
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/* extract the sign bit (upper one) */
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sign_bit = _mm_and_ps(sign_bit, *(v4sf*)_ps_sign_mask);
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/* scale by 4/Pi */
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y = _mm_mul_ps(x, *(v4sf*)_ps_cephes_FOPI);
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#ifdef USE_SSE2
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/* store the integer part of y in mm0 */
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emm2 = _mm_cvttps_epi32(y);
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/* j=(j+1) & (~1) (see the cephes sources) */
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emm2 = _mm_add_epi32(emm2, *(v4si*)_pi32_1);
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emm2 = _mm_and_si128(emm2, *(v4si*)_pi32_inv1);
|
|
y = _mm_cvtepi32_ps(emm2);
|
|
|
|
/* get the swap sign flag */
|
|
emm0 = _mm_and_si128(emm2, *(v4si*)_pi32_4);
|
|
emm0 = _mm_slli_epi32(emm0, 29);
|
|
/* get the polynom selection mask
|
|
there is one polynom for 0 <= x <= Pi/4
|
|
and another one for Pi/4<x<=Pi/2
|
|
|
|
Both branches will be computed.
|
|
*/
|
|
emm2 = _mm_and_si128(emm2, *(v4si*)_pi32_2);
|
|
emm2 = _mm_cmpeq_epi32(emm2, _mm_setzero_si128());
|
|
|
|
v4sf swap_sign_bit = _mm_castsi128_ps(emm0);
|
|
v4sf poly_mask = _mm_castsi128_ps(emm2);
|
|
sign_bit = _mm_xor_ps(sign_bit, swap_sign_bit);
|
|
|
|
#else
|
|
/* store the integer part of y in mm0:mm1 */
|
|
xmm2 = _mm_movehl_ps(xmm2, y);
|
|
mm2 = _mm_cvttps_pi32(y);
|
|
mm3 = _mm_cvttps_pi32(xmm2);
|
|
/* j=(j+1) & (~1) (see the cephes sources) */
|
|
mm2 = _mm_add_pi32(mm2, *(v2si*)_pi32_1);
|
|
mm3 = _mm_add_pi32(mm3, *(v2si*)_pi32_1);
|
|
mm2 = _mm_and_si64(mm2, *(v2si*)_pi32_inv1);
|
|
mm3 = _mm_and_si64(mm3, *(v2si*)_pi32_inv1);
|
|
y = _mm_cvtpi32x2_ps(mm2, mm3);
|
|
/* get the swap sign flag */
|
|
mm0 = _mm_and_si64(mm2, *(v2si*)_pi32_4);
|
|
mm1 = _mm_and_si64(mm3, *(v2si*)_pi32_4);
|
|
mm0 = _mm_slli_pi32(mm0, 29);
|
|
mm1 = _mm_slli_pi32(mm1, 29);
|
|
/* get the polynom selection mask */
|
|
mm2 = _mm_and_si64(mm2, *(v2si*)_pi32_2);
|
|
mm3 = _mm_and_si64(mm3, *(v2si*)_pi32_2);
|
|
mm2 = _mm_cmpeq_pi32(mm2, _mm_setzero_si64());
|
|
mm3 = _mm_cmpeq_pi32(mm3, _mm_setzero_si64());
|
|
v4sf swap_sign_bit, poly_mask;
|
|
COPY_MM_TO_XMM(mm0, mm1, swap_sign_bit);
|
|
COPY_MM_TO_XMM(mm2, mm3, poly_mask);
|
|
sign_bit = _mm_xor_ps(sign_bit, swap_sign_bit);
|
|
_mm_empty(); /* good-bye mmx */
|
|
#endif
|
|
|
|
/* The magic pass: "Extended precision modular arithmetic"
|
|
x = ((x - y * DP1) - y * DP2) - y * DP3; */
|
|
xmm1 = *(v4sf*)_ps_minus_cephes_DP1;
|
|
xmm2 = *(v4sf*)_ps_minus_cephes_DP2;
|
|
xmm3 = *(v4sf*)_ps_minus_cephes_DP3;
|
|
xmm1 = _mm_mul_ps(y, xmm1);
|
|
xmm2 = _mm_mul_ps(y, xmm2);
|
|
xmm3 = _mm_mul_ps(y, xmm3);
|
|
x = _mm_add_ps(x, xmm1);
|
|
x = _mm_add_ps(x, xmm2);
|
|
x = _mm_add_ps(x, xmm3);
|
|
|
|
/* Evaluate the first polynom (0 <= x <= Pi/4) */
|
|
y = *(v4sf*)_ps_coscof_p0;
|
|
v4sf z = _mm_mul_ps(x,x);
|
|
|
|
y = _mm_mul_ps(y, z);
|
|
y = _mm_add_ps(y, *(v4sf*)_ps_coscof_p1);
|
|
y = _mm_mul_ps(y, z);
|
|
y = _mm_add_ps(y, *(v4sf*)_ps_coscof_p2);
|
|
y = _mm_mul_ps(y, z);
|
|
y = _mm_mul_ps(y, z);
|
|
v4sf tmp = _mm_mul_ps(z, *(v4sf*)_ps_0p5);
|
|
y = _mm_sub_ps(y, tmp);
|
|
y = _mm_add_ps(y, *(v4sf*)_ps_1);
|
|
|
|
/* Evaluate the second polynom (Pi/4 <= x <= 0) */
|
|
|
|
v4sf y2 = *(v4sf*)_ps_sincof_p0;
|
|
y2 = _mm_mul_ps(y2, z);
|
|
y2 = _mm_add_ps(y2, *(v4sf*)_ps_sincof_p1);
|
|
y2 = _mm_mul_ps(y2, z);
|
|
y2 = _mm_add_ps(y2, *(v4sf*)_ps_sincof_p2);
|
|
y2 = _mm_mul_ps(y2, z);
|
|
y2 = _mm_mul_ps(y2, x);
|
|
y2 = _mm_add_ps(y2, x);
|
|
|
|
/* select the correct result from the two polynoms */
|
|
xmm3 = poly_mask;
|
|
y2 = _mm_and_ps(xmm3, y2); //, xmm3);
|
|
y = _mm_andnot_ps(xmm3, y);
|
|
y = _mm_add_ps(y,y2);
|
|
/* update the sign */
|
|
y = _mm_xor_ps(y, sign_bit);
|
|
return y;
|
|
}
|
|
|
|
/* almost the same as sin_ps */
|
|
v4sf cos_ps(v4sf x) { // any x
|
|
v4sf xmm1, xmm2 = _mm_setzero_ps(), xmm3, y;
|
|
#ifdef USE_SSE2
|
|
v4si emm0, emm2;
|
|
#else
|
|
v2si mm0, mm1, mm2, mm3;
|
|
#endif
|
|
/* take the absolute value */
|
|
x = _mm_and_ps(x, *(v4sf*)_ps_inv_sign_mask);
|
|
|
|
/* scale by 4/Pi */
|
|
y = _mm_mul_ps(x, *(v4sf*)_ps_cephes_FOPI);
|
|
|
|
#ifdef USE_SSE2
|
|
/* store the integer part of y in mm0 */
|
|
emm2 = _mm_cvttps_epi32(y);
|
|
/* j=(j+1) & (~1) (see the cephes sources) */
|
|
emm2 = _mm_add_epi32(emm2, *(v4si*)_pi32_1);
|
|
emm2 = _mm_and_si128(emm2, *(v4si*)_pi32_inv1);
|
|
y = _mm_cvtepi32_ps(emm2);
|
|
|
|
emm2 = _mm_sub_epi32(emm2, *(v4si*)_pi32_2);
|
|
|
|
/* get the swap sign flag */
|
|
emm0 = _mm_andnot_si128(emm2, *(v4si*)_pi32_4);
|
|
emm0 = _mm_slli_epi32(emm0, 29);
|
|
/* get the polynom selection mask */
|
|
emm2 = _mm_and_si128(emm2, *(v4si*)_pi32_2);
|
|
emm2 = _mm_cmpeq_epi32(emm2, _mm_setzero_si128());
|
|
|
|
v4sf sign_bit = _mm_castsi128_ps(emm0);
|
|
v4sf poly_mask = _mm_castsi128_ps(emm2);
|
|
#else
|
|
/* store the integer part of y in mm0:mm1 */
|
|
xmm2 = _mm_movehl_ps(xmm2, y);
|
|
mm2 = _mm_cvttps_pi32(y);
|
|
mm3 = _mm_cvttps_pi32(xmm2);
|
|
|
|
/* j=(j+1) & (~1) (see the cephes sources) */
|
|
mm2 = _mm_add_pi32(mm2, *(v2si*)_pi32_1);
|
|
mm3 = _mm_add_pi32(mm3, *(v2si*)_pi32_1);
|
|
mm2 = _mm_and_si64(mm2, *(v2si*)_pi32_inv1);
|
|
mm3 = _mm_and_si64(mm3, *(v2si*)_pi32_inv1);
|
|
|
|
y = _mm_cvtpi32x2_ps(mm2, mm3);
|
|
|
|
|
|
mm2 = _mm_sub_pi32(mm2, *(v2si*)_pi32_2);
|
|
mm3 = _mm_sub_pi32(mm3, *(v2si*)_pi32_2);
|
|
|
|
/* get the swap sign flag in mm0:mm1 and the
|
|
polynom selection mask in mm2:mm3 */
|
|
|
|
mm0 = _mm_andnot_si64(mm2, *(v2si*)_pi32_4);
|
|
mm1 = _mm_andnot_si64(mm3, *(v2si*)_pi32_4);
|
|
mm0 = _mm_slli_pi32(mm0, 29);
|
|
mm1 = _mm_slli_pi32(mm1, 29);
|
|
|
|
mm2 = _mm_and_si64(mm2, *(v2si*)_pi32_2);
|
|
mm3 = _mm_and_si64(mm3, *(v2si*)_pi32_2);
|
|
|
|
mm2 = _mm_cmpeq_pi32(mm2, _mm_setzero_si64());
|
|
mm3 = _mm_cmpeq_pi32(mm3, _mm_setzero_si64());
|
|
|
|
v4sf sign_bit, poly_mask;
|
|
COPY_MM_TO_XMM(mm0, mm1, sign_bit);
|
|
COPY_MM_TO_XMM(mm2, mm3, poly_mask);
|
|
_mm_empty(); /* good-bye mmx */
|
|
#endif
|
|
/* The magic pass: "Extended precision modular arithmetic"
|
|
x = ((x - y * DP1) - y * DP2) - y * DP3; */
|
|
xmm1 = *(v4sf*)_ps_minus_cephes_DP1;
|
|
xmm2 = *(v4sf*)_ps_minus_cephes_DP2;
|
|
xmm3 = *(v4sf*)_ps_minus_cephes_DP3;
|
|
xmm1 = _mm_mul_ps(y, xmm1);
|
|
xmm2 = _mm_mul_ps(y, xmm2);
|
|
xmm3 = _mm_mul_ps(y, xmm3);
|
|
x = _mm_add_ps(x, xmm1);
|
|
x = _mm_add_ps(x, xmm2);
|
|
x = _mm_add_ps(x, xmm3);
|
|
|
|
/* Evaluate the first polynom (0 <= x <= Pi/4) */
|
|
y = *(v4sf*)_ps_coscof_p0;
|
|
v4sf z = _mm_mul_ps(x,x);
|
|
|
|
y = _mm_mul_ps(y, z);
|
|
y = _mm_add_ps(y, *(v4sf*)_ps_coscof_p1);
|
|
y = _mm_mul_ps(y, z);
|
|
y = _mm_add_ps(y, *(v4sf*)_ps_coscof_p2);
|
|
y = _mm_mul_ps(y, z);
|
|
y = _mm_mul_ps(y, z);
|
|
v4sf tmp = _mm_mul_ps(z, *(v4sf*)_ps_0p5);
|
|
y = _mm_sub_ps(y, tmp);
|
|
y = _mm_add_ps(y, *(v4sf*)_ps_1);
|
|
|
|
/* Evaluate the second polynom (Pi/4 <= x <= 0) */
|
|
|
|
v4sf y2 = *(v4sf*)_ps_sincof_p0;
|
|
y2 = _mm_mul_ps(y2, z);
|
|
y2 = _mm_add_ps(y2, *(v4sf*)_ps_sincof_p1);
|
|
y2 = _mm_mul_ps(y2, z);
|
|
y2 = _mm_add_ps(y2, *(v4sf*)_ps_sincof_p2);
|
|
y2 = _mm_mul_ps(y2, z);
|
|
y2 = _mm_mul_ps(y2, x);
|
|
y2 = _mm_add_ps(y2, x);
|
|
|
|
/* select the correct result from the two polynoms */
|
|
xmm3 = poly_mask;
|
|
y2 = _mm_and_ps(xmm3, y2); //, xmm3);
|
|
y = _mm_andnot_ps(xmm3, y);
|
|
y = _mm_add_ps(y,y2);
|
|
/* update the sign */
|
|
y = _mm_xor_ps(y, sign_bit);
|
|
|
|
return y;
|
|
}
|
|
|
|
/* since sin_ps and cos_ps are almost identical, sincos_ps could replace both of them..
|
|
it is almost as fast, and gives you a free cosine with your sine */
|
|
void sincos_ps(v4sf x, v4sf *s, v4sf *c) {
|
|
v4sf xmm1, xmm2, xmm3 = _mm_setzero_ps(), sign_bit_sin, y;
|
|
#ifdef USE_SSE2
|
|
v4si emm0, emm2, emm4;
|
|
#else
|
|
v2si mm0, mm1, mm2, mm3, mm4, mm5;
|
|
#endif
|
|
sign_bit_sin = x;
|
|
/* take the absolute value */
|
|
x = _mm_and_ps(x, *(v4sf*)_ps_inv_sign_mask);
|
|
/* extract the sign bit (upper one) */
|
|
sign_bit_sin = _mm_and_ps(sign_bit_sin, *(v4sf*)_ps_sign_mask);
|
|
|
|
/* scale by 4/Pi */
|
|
y = _mm_mul_ps(x, *(v4sf*)_ps_cephes_FOPI);
|
|
|
|
#ifdef USE_SSE2
|
|
/* store the integer part of y in emm2 */
|
|
emm2 = _mm_cvttps_epi32(y);
|
|
|
|
/* j=(j+1) & (~1) (see the cephes sources) */
|
|
emm2 = _mm_add_epi32(emm2, *(v4si*)_pi32_1);
|
|
emm2 = _mm_and_si128(emm2, *(v4si*)_pi32_inv1);
|
|
y = _mm_cvtepi32_ps(emm2);
|
|
|
|
emm4 = emm2;
|
|
|
|
/* get the swap sign flag for the sine */
|
|
emm0 = _mm_and_si128(emm2, *(v4si*)_pi32_4);
|
|
emm0 = _mm_slli_epi32(emm0, 29);
|
|
v4sf swap_sign_bit_sin = _mm_castsi128_ps(emm0);
|
|
|
|
/* get the polynom selection mask for the sine*/
|
|
emm2 = _mm_and_si128(emm2, *(v4si*)_pi32_2);
|
|
emm2 = _mm_cmpeq_epi32(emm2, _mm_setzero_si128());
|
|
v4sf poly_mask = _mm_castsi128_ps(emm2);
|
|
#else
|
|
/* store the integer part of y in mm2:mm3 */
|
|
xmm3 = _mm_movehl_ps(xmm3, y);
|
|
mm2 = _mm_cvttps_pi32(y);
|
|
mm3 = _mm_cvttps_pi32(xmm3);
|
|
|
|
/* j=(j+1) & (~1) (see the cephes sources) */
|
|
mm2 = _mm_add_pi32(mm2, *(v2si*)_pi32_1);
|
|
mm3 = _mm_add_pi32(mm3, *(v2si*)_pi32_1);
|
|
mm2 = _mm_and_si64(mm2, *(v2si*)_pi32_inv1);
|
|
mm3 = _mm_and_si64(mm3, *(v2si*)_pi32_inv1);
|
|
|
|
y = _mm_cvtpi32x2_ps(mm2, mm3);
|
|
|
|
mm4 = mm2;
|
|
mm5 = mm3;
|
|
|
|
/* get the swap sign flag for the sine */
|
|
mm0 = _mm_and_si64(mm2, *(v2si*)_pi32_4);
|
|
mm1 = _mm_and_si64(mm3, *(v2si*)_pi32_4);
|
|
mm0 = _mm_slli_pi32(mm0, 29);
|
|
mm1 = _mm_slli_pi32(mm1, 29);
|
|
v4sf swap_sign_bit_sin;
|
|
COPY_MM_TO_XMM(mm0, mm1, swap_sign_bit_sin);
|
|
|
|
/* get the polynom selection mask for the sine */
|
|
|
|
mm2 = _mm_and_si64(mm2, *(v2si*)_pi32_2);
|
|
mm3 = _mm_and_si64(mm3, *(v2si*)_pi32_2);
|
|
mm2 = _mm_cmpeq_pi32(mm2, _mm_setzero_si64());
|
|
mm3 = _mm_cmpeq_pi32(mm3, _mm_setzero_si64());
|
|
v4sf poly_mask;
|
|
COPY_MM_TO_XMM(mm2, mm3, poly_mask);
|
|
#endif
|
|
|
|
/* The magic pass: "Extended precision modular arithmetic"
|
|
x = ((x - y * DP1) - y * DP2) - y * DP3; */
|
|
xmm1 = *(v4sf*)_ps_minus_cephes_DP1;
|
|
xmm2 = *(v4sf*)_ps_minus_cephes_DP2;
|
|
xmm3 = *(v4sf*)_ps_minus_cephes_DP3;
|
|
xmm1 = _mm_mul_ps(y, xmm1);
|
|
xmm2 = _mm_mul_ps(y, xmm2);
|
|
xmm3 = _mm_mul_ps(y, xmm3);
|
|
x = _mm_add_ps(x, xmm1);
|
|
x = _mm_add_ps(x, xmm2);
|
|
x = _mm_add_ps(x, xmm3);
|
|
|
|
#ifdef USE_SSE2
|
|
emm4 = _mm_sub_epi32(emm4, *(v4si*)_pi32_2);
|
|
emm4 = _mm_andnot_si128(emm4, *(v4si*)_pi32_4);
|
|
emm4 = _mm_slli_epi32(emm4, 29);
|
|
v4sf sign_bit_cos = _mm_castsi128_ps(emm4);
|
|
#else
|
|
/* get the sign flag for the cosine */
|
|
mm4 = _mm_sub_pi32(mm4, *(v2si*)_pi32_2);
|
|
mm5 = _mm_sub_pi32(mm5, *(v2si*)_pi32_2);
|
|
mm4 = _mm_andnot_si64(mm4, *(v2si*)_pi32_4);
|
|
mm5 = _mm_andnot_si64(mm5, *(v2si*)_pi32_4);
|
|
mm4 = _mm_slli_pi32(mm4, 29);
|
|
mm5 = _mm_slli_pi32(mm5, 29);
|
|
v4sf sign_bit_cos;
|
|
COPY_MM_TO_XMM(mm4, mm5, sign_bit_cos);
|
|
_mm_empty(); /* good-bye mmx */
|
|
#endif
|
|
|
|
sign_bit_sin = _mm_xor_ps(sign_bit_sin, swap_sign_bit_sin);
|
|
|
|
|
|
/* Evaluate the first polynom (0 <= x <= Pi/4) */
|
|
v4sf z = _mm_mul_ps(x,x);
|
|
y = *(v4sf*)_ps_coscof_p0;
|
|
|
|
y = _mm_mul_ps(y, z);
|
|
y = _mm_add_ps(y, *(v4sf*)_ps_coscof_p1);
|
|
y = _mm_mul_ps(y, z);
|
|
y = _mm_add_ps(y, *(v4sf*)_ps_coscof_p2);
|
|
y = _mm_mul_ps(y, z);
|
|
y = _mm_mul_ps(y, z);
|
|
v4sf tmp = _mm_mul_ps(z, *(v4sf*)_ps_0p5);
|
|
y = _mm_sub_ps(y, tmp);
|
|
y = _mm_add_ps(y, *(v4sf*)_ps_1);
|
|
|
|
/* Evaluate the second polynom (Pi/4 <= x <= 0) */
|
|
|
|
v4sf y2 = *(v4sf*)_ps_sincof_p0;
|
|
y2 = _mm_mul_ps(y2, z);
|
|
y2 = _mm_add_ps(y2, *(v4sf*)_ps_sincof_p1);
|
|
y2 = _mm_mul_ps(y2, z);
|
|
y2 = _mm_add_ps(y2, *(v4sf*)_ps_sincof_p2);
|
|
y2 = _mm_mul_ps(y2, z);
|
|
y2 = _mm_mul_ps(y2, x);
|
|
y2 = _mm_add_ps(y2, x);
|
|
|
|
/* select the correct result from the two polynoms */
|
|
xmm3 = poly_mask;
|
|
v4sf ysin2 = _mm_and_ps(xmm3, y2);
|
|
v4sf ysin1 = _mm_andnot_ps(xmm3, y);
|
|
y2 = _mm_sub_ps(y2,ysin2);
|
|
y = _mm_sub_ps(y, ysin1);
|
|
|
|
xmm1 = _mm_add_ps(ysin1,ysin2);
|
|
xmm2 = _mm_add_ps(y,y2);
|
|
|
|
/* update the sign */
|
|
*s = _mm_xor_ps(xmm1, sign_bit_sin);
|
|
*c = _mm_xor_ps(xmm2, sign_bit_cos);
|
|
}
|
|
|
|
#endif
|