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194 lines
5.2 KiB
C
194 lines
5.2 KiB
C
/* Implementation of the ERFC_SCALED intrinsic, to be included by erfc_scaled.c
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Copyright (c) 2008, 2010 Free Software Foundation, Inc.
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This file is part of the GNU Fortran runtime library (libgfortran).
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Libgfortran is free software; you can redistribute it and/or
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modify it under the terms of the GNU General Public
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License as published by the Free Software Foundation; either
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version 3 of the License, or (at your option) any later version.
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Libgfortran 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
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GNU General Public License for more details.
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Under Section 7 of GPL version 3, you are granted additional
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permissions described in the GCC Runtime Library Exception, version
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3.1, as published by the Free Software Foundation.
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You should have received a copy of the GNU General Public License and
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a copy of the GCC Runtime Library Exception along with this program;
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see the files COPYING3 and COPYING.RUNTIME respectively. If not, see
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<http://www.gnu.org/licenses/>. */
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/* This implementation of ERFC_SCALED is based on the netlib algorithm
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available at http://www.netlib.org/specfun/erf */
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#define TYPE KIND_SUFFIX(GFC_REAL_,KIND)
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#define CONCAT(x,y) x ## y
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#define KIND_SUFFIX(x,y) CONCAT(x,y)
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#if (KIND == 4)
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# define EXP(x) expf(x)
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# define TRUNC(x) truncf(x)
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#elif (KIND == 8)
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# define EXP(x) exp(x)
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# define TRUNC(x) trunc(x)
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#elif (KIND == 10) || (KIND == 16 && defined(GFC_REAL_16_IS_LONG_DOUBLE))
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# ifdef HAVE_EXPL
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# define EXP(x) expl(x)
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# endif
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# ifdef HAVE_TRUNCL
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# define TRUNC(x) truncl(x)
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# endif
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#elif (KIND == 16 && defined(GFC_REAL_16_IS_FLOAT128))
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# define EXP(x) expq(x)
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# define TRUNC(x) truncq(x)
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#else
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# error "What exactly is it that you want me to do?"
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#endif
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#if defined(EXP) && defined(TRUNC)
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extern TYPE KIND_SUFFIX(erfc_scaled_r,KIND) (TYPE);
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export_proto(KIND_SUFFIX(erfc_scaled_r,KIND));
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TYPE
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KIND_SUFFIX(erfc_scaled_r,KIND) (TYPE x)
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{
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/* The main computation evaluates near-minimax approximations
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from "Rational Chebyshev approximations for the error function"
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by W. J. Cody, Math. Comp., 1969, PP. 631-638. This
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transportable program uses rational functions that theoretically
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approximate erf(x) and erfc(x) to at least 18 significant
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decimal digits. The accuracy achieved depends on the arithmetic
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system, the compiler, the intrinsic functions, and proper
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selection of the machine-dependent constants. */
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int i;
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TYPE del, res, xden, xnum, y, ysq;
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#if (KIND == 4)
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static TYPE xneg = -9.382, xsmall = 5.96e-8,
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xbig = 9.194, xhuge = 2.90e+3, xmax = 4.79e+37;
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#else
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static TYPE xneg = -26.628, xsmall = 1.11e-16,
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xbig = 26.543, xhuge = 6.71e+7, xmax = 2.53e+307;
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#endif
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#define SQRPI ((TYPE) 0.56418958354775628695L)
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#define THRESH ((TYPE) 0.46875L)
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static TYPE a[5] = { 3.16112374387056560l, 113.864154151050156l,
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377.485237685302021l, 3209.37758913846947l, 0.185777706184603153l };
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static TYPE b[4] = { 23.6012909523441209l, 244.024637934444173l,
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1282.61652607737228l, 2844.23683343917062l };
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static TYPE c[9] = { 0.564188496988670089l, 8.88314979438837594l,
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66.1191906371416295l, 298.635138197400131l, 881.952221241769090l,
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1712.04761263407058l, 2051.07837782607147l, 1230.33935479799725l,
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2.15311535474403846e-8l };
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static TYPE d[8] = { 15.7449261107098347l, 117.693950891312499l,
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537.181101862009858l, 1621.38957456669019l, 3290.79923573345963l,
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4362.61909014324716l, 3439.36767414372164l, 1230.33935480374942l };
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static TYPE p[6] = { 0.305326634961232344l, 0.360344899949804439l,
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0.125781726111229246l, 0.0160837851487422766l,
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0.000658749161529837803l, 0.0163153871373020978l };
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static TYPE q[5] = { 2.56852019228982242l, 1.87295284992346047l,
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0.527905102951428412l, 0.0605183413124413191l,
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0.00233520497626869185l };
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y = (x > 0 ? x : -x);
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if (y <= THRESH)
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{
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ysq = 0;
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if (y > xsmall)
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ysq = y * y;
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xnum = a[4]*ysq;
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xden = ysq;
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for (i = 0; i <= 2; i++)
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{
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xnum = (xnum + a[i]) * ysq;
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xden = (xden + b[i]) * ysq;
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}
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res = x * (xnum + a[3]) / (xden + b[3]);
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res = 1 - res;
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res = EXP(ysq) * res;
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return res;
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}
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else if (y <= 4)
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{
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xnum = c[8]*y;
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xden = y;
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for (i = 0; i <= 6; i++)
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{
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xnum = (xnum + c[i]) * y;
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xden = (xden + d[i]) * y;
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}
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res = (xnum + c[7]) / (xden + d[7]);
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}
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else
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{
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res = 0;
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if (y >= xbig)
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{
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if (y >= xmax)
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goto finish;
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if (y >= xhuge)
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{
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res = SQRPI / y;
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goto finish;
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}
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}
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ysq = ((TYPE) 1) / (y * y);
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xnum = p[5]*ysq;
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xden = ysq;
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for (i = 0; i <= 3; i++)
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{
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xnum = (xnum + p[i]) * ysq;
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xden = (xden + q[i]) * ysq;
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}
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res = ysq *(xnum + p[4]) / (xden + q[4]);
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res = (SQRPI - res) / y;
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}
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finish:
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if (x < 0)
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{
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if (x < xneg)
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res = __builtin_inf ();
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else
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{
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ysq = TRUNC (x*((TYPE) 16))/((TYPE) 16);
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del = (x-ysq)*(x+ysq);
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y = EXP(ysq*ysq) * EXP(del);
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res = (y+y) - res;
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}
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}
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return res;
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}
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#endif
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#undef EXP
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#undef TRUNC
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#undef CONCAT
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#undef TYPE
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#undef KIND_SUFFIX
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