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/* -------------------------------------------------------------- */ /* (C)Copyright 2007,2008, */ /* International Business Machines Corporation */ /* All Rights Reserved. */ /* */ /* Redistribution and use in source and binary forms, with or */ /* without modification, are permitted provided that the */ /* following conditions are met: */ /* */ /* - Redistributions of source code must retain the above copyright*/ /* notice, this list of conditions and the following disclaimer. */ /* */ /* - Redistributions in binary form must reproduce the above */ /* copyright notice, this list of conditions and the following */ /* disclaimer in the documentation and/or other materials */ /* provided with the distribution. */ /* */ /* - Neither the name of IBM Corporation nor the names of its */ /* contributors may be used to endorse or promote products */ /* derived from this software without specific prior written */ /* permission. */ /* */ /* THIS SOFTWARE IS PROVIDED BY THE COPYRIGHT HOLDERS AND */ /* CONTRIBUTORS "AS IS" AND ANY EXPRESS OR IMPLIED WARRANTIES, */ /* INCLUDING, BUT NOT LIMITED TO, THE IMPLIED WARRANTIES OF */ /* MERCHANTABILITY AND FITNESS FOR A PARTICULAR PURPOSE ARE */ /* DISCLAIMED. IN NO EVENT SHALL THE COPYRIGHT OWNER OR */ /* CONTRIBUTORS BE LIABLE FOR ANY DIRECT, INDIRECT, INCIDENTAL, */ /* SPECIAL, EXEMPLARY, OR CONSEQUENTIAL DAMAGES (INCLUDING, BUT */ /* NOT LIMITED TO, PROCUREMENT OF SUBSTITUTE GOODS OR SERVICES; */ /* LOSS OF USE, DATA, OR PROFITS; OR BUSINESS INTERRUPTION) */ /* HOWEVER CAUSED AND ON ANY THEORY OF LIABILITY, WHETHER IN */ /* CONTRACT, STRICT LIABILITY, OR TORT (INCLUDING NEGLIGENCE OR */ /* OTHERWISE) ARISING IN ANY WAY OUT OF THE USE OF THIS SOFTWARE, */ /* EVEN IF ADVISED OF THE POSSIBILITY OF SUCH DAMAGE. */ /* -------------------------------------------------------------- */ /* PROLOG END TAG zYx */ #ifdef __SPU__ #ifndef _TGAMMAF4_H_ #define _TGAMMAF4_H_ 1 #include <spu_intrinsics.h> #include "simdmath.h" #include "recipf4.h" #include "truncf4.h" #include "expf4.h" #include "logf4.h" #include "divf4.h" #include "sinf4.h" #include "powf4.h" #include "tgammad2.h" /* * FUNCTION * vector float _tgammaf4(vector float x) * * DESCRIPTION * The tgammaf4 function returns a vector containing tgamma for each * element of x * * We take a fairly standard approach - break the domain into 5 separate regions: * * 1. [-infinity, 0) - use gamma(x) = pi/(x*gamma(-x)*sin(x*pi)) * 2. [0, 1) - push x into [1,2), then adjust the * result. * 3. [1, 2) - use a rational approximation. * 4. [2, 10) - pull back into [1, 2), then adjust * the result. * 5. [10, +infinity] - use Stirling's Approximation. * * * Special Cases: * - tgamma(+/- 0) returns +/- infinity * - tgamma(negative integer) returns NaN * - tgamma(-infinity) returns NaN * - tgamma(infinity) returns infinity * */ /* * Coefficients for Stirling's Series for Gamma() are defined in * tgammad2.h */ /* * Rational Approximation Coefficients for the * domain [1, 2) are defined in tgammad2.h */ static __inline vector float _tgammaf4(vector float x) { vector float signbit = spu_splats(-0.0f); vector float zerof = spu_splats(0.0f); vector float halff = spu_splats(0.5f); vector float onef = spu_splats(1.0f); vector float ninep9f = (vector float)spu_splats(0x411FFFFF); /* Next closest to 10.0 */ vector float t38f = spu_splats(38.0f); vector float pi = spu_splats((float)SM_PI); vector float sqrt2pi = spu_splats(2.506628274631000502415765284811f); vector float inf = (vec_float4)spu_splats(0x7F800000); vector float nan = (vec_float4)spu_splats(0x7FFFFFFF); vector float xabs; vector float xscaled; vector float xtrunc; vector float xinv; vector float nresult; /* Negative x result */ vector float rresult; /* Rational Approx result */ vector float sresult; /* Stirling's result */ vector float result; vector float pr,qr; vector unsigned int gt0 = spu_cmpgt(x, zerof); vector unsigned int gt1 = spu_cmpgt(x, onef); vector unsigned int gt9p9 = spu_cmpgt(x, ninep9f); vector unsigned int gt38 = spu_cmpgt(x, t38f); xabs = spu_andc(x, signbit); /* * For x in [0, 1], add 1 to x, use rational * approximation, then use: * * gamma(x) = gamma(x+1)/x * */ xabs = spu_sel(spu_add(xabs, onef), xabs, gt1); xtrunc = _truncf4(xabs); /* * For x in [2, 10): */ xscaled = spu_add(onef, spu_sub(xabs, xtrunc)); /* * For x in [1,2), use a rational approximation. */ pr = spu_madd(xscaled, spu_splats((float)TGD2_P07), spu_splats((float)TGD2_P06)); pr = spu_madd(pr, xscaled, spu_splats((float)TGD2_P05)); pr = spu_madd(pr, xscaled, spu_splats((float)TGD2_P04)); pr = spu_madd(pr, xscaled, spu_splats((float)TGD2_P03)); pr = spu_madd(pr, xscaled, spu_splats((float)TGD2_P02)); pr = spu_madd(pr, xscaled, spu_splats((float)TGD2_P01)); pr = spu_madd(pr, xscaled, spu_splats((float)TGD2_P00)); qr = spu_madd(xscaled, spu_splats((float)TGD2_Q07), spu_splats((float)TGD2_Q06)); qr = spu_madd(qr, xscaled, spu_splats((float)TGD2_Q05)); qr = spu_madd(qr, xscaled, spu_splats((float)TGD2_Q04)); qr = spu_madd(qr, xscaled, spu_splats((float)TGD2_Q03)); qr = spu_madd(qr, xscaled, spu_splats((float)TGD2_Q02)); qr = spu_madd(qr, xscaled, spu_splats((float)TGD2_Q01)); qr = spu_madd(qr, xscaled, spu_splats((float)TGD2_Q00)); rresult = _divf4(pr, qr); rresult = spu_sel(_divf4(rresult, x), rresult, gt1); /* * If x was in [2,10) and we pulled it into [1,2), we need to push * it back out again. */ rresult = spu_sel(rresult, spu_mul(rresult, xscaled), spu_cmpgt(x, xscaled)); /* [2,3) */ xscaled = spu_add(xscaled, onef); rresult = spu_sel(rresult, spu_mul(rresult, xscaled), spu_cmpgt(x, xscaled)); /* [3,4) */ xscaled = spu_add(xscaled, onef); rresult = spu_sel(rresult, spu_mul(rresult, xscaled), spu_cmpgt(x, xscaled)); /* [4,5) */ xscaled = spu_add(xscaled, onef); rresult = spu_sel(rresult, spu_mul(rresult, xscaled), spu_cmpgt(x, xscaled)); /* [5,6) */ xscaled = spu_add(xscaled, onef); rresult = spu_sel(rresult, spu_mul(rresult, xscaled), spu_cmpgt(x, xscaled)); /* [6,7) */ xscaled = spu_add(xscaled, onef); rresult = spu_sel(rresult, spu_mul(rresult, xscaled), spu_cmpgt(x, xscaled)); /* [7,8) */ xscaled = spu_add(xscaled, onef); rresult = spu_sel(rresult, spu_mul(rresult, xscaled), spu_cmpgt(x, xscaled)); /* [8,9) */ xscaled = spu_add(xscaled, onef); rresult = spu_sel(rresult, spu_mul(rresult, xscaled), spu_cmpgt(x, xscaled)); /* [9,10) */ /* * For x >= 10, we use Stirling's Approximation */ vector float sum; xinv = _recipf4(xabs); sum = spu_madd(xinv, spu_splats((float)STIRLING_16), spu_splats((float)STIRLING_15)); sum = spu_madd(sum, xinv, spu_splats((float)STIRLING_14)); sum = spu_madd(sum, xinv, spu_splats((float)STIRLING_13)); sum = spu_madd(sum, xinv, spu_splats((float)STIRLING_12)); sum = spu_madd(sum, xinv, spu_splats((float)STIRLING_11)); sum = spu_madd(sum, xinv, spu_splats((float)STIRLING_10)); sum = spu_madd(sum, xinv, spu_splats((float)STIRLING_09)); sum = spu_madd(sum, xinv, spu_splats((float)STIRLING_08)); sum = spu_madd(sum, xinv, spu_splats((float)STIRLING_07)); sum = spu_madd(sum, xinv, spu_splats((float)STIRLING_06)); sum = spu_madd(sum, xinv, spu_splats((float)STIRLING_05)); sum = spu_madd(sum, xinv, spu_splats((float)STIRLING_04)); sum = spu_madd(sum, xinv, spu_splats((float)STIRLING_03)); sum = spu_madd(sum, xinv, spu_splats((float)STIRLING_02)); sum = spu_madd(sum, xinv, spu_splats((float)STIRLING_01)); sum = spu_madd(sum, xinv, spu_splats((float)STIRLING_00)); sum = spu_mul(sum, sqrt2pi); sum = spu_mul(sum, _powf4(x, spu_sub(x, halff))); sresult = spu_mul(sum, _expf4(spu_or(x, signbit))); /* * Choose rational approximation or Stirling's result. */ result = spu_sel(rresult, sresult, gt9p9); result = spu_sel(result, inf, gt38); /* For x < 0, use: * gamma(x) = pi/(x*gamma(-x)*sin(x*pi)) */ nresult = _divf4(pi, spu_mul(x, spu_mul(result, _sinf4(spu_mul(x, pi))))); result = spu_sel(nresult, result, gt0); /* * x = non-positive integer, return NaN. */ result = spu_sel(result, nan, spu_andc(spu_cmpeq(x, xtrunc), gt0)); return result; } #endif /* _TGAMMAF4_H_ */ #endif /* __SPU__ */