2004-05-13 08:41:07 +02:00
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/* Complex exponential functions
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Copyright 2002, 2004 Free Software Foundation, Inc.
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Contributed by Paul Brook <paul@nowt.org>
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2005-01-12 22:27:33 +01:00
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This file is part of the GNU Fortran 95 runtime library (libgfortran).
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2004-05-13 08:41:07 +02:00
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Libgfortran is free software; you can redistribute it and/or
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2005-01-12 22:27:33 +01:00
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modify it under the terms of the GNU General Public
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2004-05-13 08:41:07 +02:00
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License as published by the Free Software Foundation; either
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2005-01-12 22:27:33 +01:00
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version 2 of the License, or (at your option) any later version.
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In addition to the permissions in the GNU General Public License, the
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Free Software Foundation gives you unlimited permission to link the
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compiled version of this file into combinations with other programs,
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and to distribute those combinations without any restriction coming
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from the use of this file. (The General Public License restrictions
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do apply in other respects; for example, they cover modification of
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the file, and distribution when not linked into a combine
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executable.)
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2004-05-13 08:41:07 +02:00
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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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2005-01-12 22:27:33 +01:00
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GNU General Public License for more details.
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2004-05-13 08:41:07 +02:00
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2005-01-12 22:27:33 +01:00
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You should have received a copy of the GNU General Public
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License along with libgfortran; see the file COPYING. If not,
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2004-05-13 08:41:07 +02:00
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write to the Free Software Foundation, Inc., 59 Temple Place - Suite 330,
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Boston, MA 02111-1307, USA. */
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#include <math.h>
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#include "libgfortran.h"
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/* z = a + ib */
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/* Absolute value. */
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GFC_REAL_4
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cabsf (GFC_COMPLEX_4 z)
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{
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return hypotf (REALPART (z), IMAGPART (z));
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}
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2004-07-11 18:05:08 +02:00
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/* Complex argument. The angle made with the +ve real axis.
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Range -pi-pi. */
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2004-05-13 08:41:07 +02:00
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GFC_REAL_4
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cargf (GFC_COMPLEX_4 z)
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{
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GFC_REAL_4 arg;
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2004-07-11 18:05:08 +02:00
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return atan2f (IMAGPART (z), REALPART (z));
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2004-05-13 08:41:07 +02:00
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}
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/* exp(z) = exp(a)*(cos(b) + isin(b)) */
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GFC_COMPLEX_4
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cexpf (GFC_COMPLEX_4 z)
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{
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GFC_REAL_4 a;
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GFC_REAL_4 b;
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GFC_COMPLEX_4 v;
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a = REALPART (z);
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b = IMAGPART (z);
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COMPLEX_ASSIGN (v, cosf (b), sinf (b));
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return expf (a) * v;
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}
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/* log(z) = log (cabs(z)) + i*carg(z) */
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GFC_COMPLEX_4
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clogf (GFC_COMPLEX_4 z)
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{
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GFC_COMPLEX_4 v;
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COMPLEX_ASSIGN (v, logf (cabsf (z)), cargf (z));
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return v;
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}
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/* log10(z) = log10 (cabs(z)) + i*carg(z) */
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GFC_COMPLEX_4
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clog10f (GFC_COMPLEX_4 z)
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{
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GFC_COMPLEX_4 v;
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COMPLEX_ASSIGN (v, log10f (cabsf (z)), cargf (z));
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return v;
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}
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/* pow(base, power) = cexp (power * clog (base)) */
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GFC_COMPLEX_4
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cpowf (GFC_COMPLEX_4 base, GFC_COMPLEX_4 power)
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{
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return cexpf (power * clogf (base));
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}
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/* sqrt(z). Algorithm pulled from glibc. */
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GFC_COMPLEX_4
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csqrtf (GFC_COMPLEX_4 z)
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{
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GFC_REAL_4 re;
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GFC_REAL_4 im;
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GFC_COMPLEX_4 v;
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re = REALPART (z);
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im = IMAGPART (z);
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if (im == 0.0)
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{
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if (re < 0.0)
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{
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COMPLEX_ASSIGN (v, 0.0, copysignf (sqrtf (-re), im));
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}
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else
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{
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COMPLEX_ASSIGN (v, fabsf (sqrt (re)),
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copysignf (0.0, im));
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}
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}
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else if (re == 0.0)
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{
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GFC_REAL_4 r;
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r = sqrtf (0.5 * fabs (im));
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COMPLEX_ASSIGN (v, copysignf (r, im), r);
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}
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else
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{
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GFC_REAL_4 d, r, s;
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d = hypotf (re, im);
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/* Use the identity 2 Re res Im res = Im x
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to avoid cancellation error in d +/- Re x. */
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if (re > 0)
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{
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r = sqrtf (0.5 * d + 0.5 * re);
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s = (0.5 * im) / r;
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}
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else
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{
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s = sqrtf (0.5 * d - 0.5 * re);
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r = fabsf ((0.5 * im) / s);
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}
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COMPLEX_ASSIGN (v, r, copysignf (s, im));
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}
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return v;
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}
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