mirror of https://github.com/python/cpython.git
653 lines
14 KiB
C
653 lines
14 KiB
C
/***********************************************************
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Copyright 1991-1995 by Stichting Mathematisch Centrum, Amsterdam,
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The Netherlands.
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All Rights Reserved
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Permission to use, copy, modify, and distribute this software and its
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documentation for any purpose and without fee is hereby granted,
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provided that the above copyright notice appear in all copies and that
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both that copyright notice and this permission notice appear in
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supporting documentation, and that the names of Stichting Mathematisch
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Centrum or CWI or Corporation for National Research Initiatives or
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CNRI not be used in advertising or publicity pertaining to
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distribution of the software without specific, written prior
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permission.
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While CWI is the initial source for this software, a modified version
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is made available by the Corporation for National Research Initiatives
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(CNRI) at the Internet address ftp://ftp.python.org.
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STICHTING MATHEMATISCH CENTRUM AND CNRI DISCLAIM ALL WARRANTIES WITH
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REGARD TO THIS SOFTWARE, INCLUDING ALL IMPLIED WARRANTIES OF
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MERCHANTABILITY AND FITNESS, IN NO EVENT SHALL STICHTING MATHEMATISCH
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CENTRUM OR CNRI BE LIABLE FOR ANY SPECIAL, INDIRECT OR CONSEQUENTIAL
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DAMAGES OR ANY DAMAGES WHATSOEVER RESULTING FROM LOSS OF USE, DATA OR
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PROFITS, WHETHER IN AN ACTION OF CONTRACT, NEGLIGENCE OR OTHER
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TORTIOUS ACTION, ARISING OUT OF OR IN CONNECTION WITH THE USE OR
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PERFORMANCE OF THIS SOFTWARE.
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******************************************************************/
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/* Complex object implementation */
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/* Borrows heavily from floatobject.c */
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/* Submitted by Jim Hugunin */
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#ifndef WITHOUT_COMPLEX
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#include "Python.h"
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#include "mymath.h"
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#ifdef HAVE_LIMITS_H
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#include <limits.h>
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#endif
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/* elementary operations on complex numbers */
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static Py_complex c_1 = {1., 0.};
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Py_complex c_sum(a,b)
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Py_complex a,b;
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{
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Py_complex r;
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r.real = a.real + b.real;
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r.imag = a.imag + b.imag;
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return r;
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}
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Py_complex c_diff(a,b)
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Py_complex a,b;
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{
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Py_complex r;
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r.real = a.real - b.real;
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r.imag = a.imag - b.imag;
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return r;
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}
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Py_complex c_neg(a)
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Py_complex a;
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{
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Py_complex r;
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r.real = -a.real;
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r.imag = -a.imag;
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return r;
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}
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Py_complex c_prod(a,b)
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Py_complex a,b;
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{
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Py_complex r;
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r.real = a.real*b.real - a.imag*b.imag;
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r.imag = a.real*b.imag + a.imag*b.real;
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return r;
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}
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Py_complex c_quot(a,b)
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Py_complex a,b;
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{
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Py_complex r;
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double d = b.real*b.real + b.imag*b.imag;
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if (d == 0.)
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errno = EDOM;
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r.real = (a.real*b.real + a.imag*b.imag)/d;
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r.imag = (a.imag*b.real - a.real*b.imag)/d;
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return r;
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}
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Py_complex c_pow(a,b)
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Py_complex a,b;
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{
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Py_complex r;
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double vabs,len,at,phase;
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if (b.real == 0. && b.imag == 0.) {
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r.real = 1.;
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r.imag = 0.;
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}
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else if (a.real == 0. && a.imag == 0.) {
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if (b.imag != 0. || b.real < 0.)
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errno = ERANGE;
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r.real = 0.;
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r.imag = 0.;
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}
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else {
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vabs = hypot(a.real,a.imag);
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len = pow(vabs,b.real);
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at = atan2(a.imag, a.real);
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phase = at*b.real;
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if (b.imag != 0.0) {
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len /= exp(at*b.imag);
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phase += b.imag*log(vabs);
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}
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r.real = len*cos(phase);
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r.imag = len*sin(phase);
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}
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return r;
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}
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static Py_complex c_powu(x, n)
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Py_complex x;
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long n;
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{
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Py_complex r, p;
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long mask = 1;
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r = c_1;
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p = x;
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while (mask > 0 && n >= mask) {
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if (n & mask)
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r = c_prod(r,p);
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mask <<= 1;
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p = c_prod(p,p);
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}
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return r;
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}
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static Py_complex c_powi(x, n)
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Py_complex x;
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long n;
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{
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Py_complex cn;
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if (n > 100 || n < -100) {
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cn.real = (double) n;
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cn.imag = 0.;
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return c_pow(x,cn);
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}
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else if (n > 0)
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return c_powu(x,n);
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else
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return c_quot(c_1,c_powu(x,-n));
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}
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PyObject *
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PyComplex_FromCComplex(cval)
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Py_complex cval;
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{
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register PyComplexObject *op =
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(PyComplexObject *) malloc(sizeof(PyComplexObject));
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if (op == NULL)
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return PyErr_NoMemory();
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op->ob_type = &PyComplex_Type;
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op->cval = cval;
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_Py_NewReference((PyObject *)op);
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return (PyObject *) op;
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}
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PyObject *
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PyComplex_FromDoubles(real, imag)
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double real, imag;
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{
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Py_complex c;
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c.real = real;
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c.imag = imag;
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return PyComplex_FromCComplex(c);
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}
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double
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PyComplex_RealAsDouble(op)
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PyObject *op;
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{
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if (PyComplex_Check(op)) {
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return ((PyComplexObject *)op)->cval.real;
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} else {
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return PyFloat_AsDouble(op);
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}
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}
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double
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PyComplex_ImagAsDouble(op)
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PyObject *op;
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{
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if (PyComplex_Check(op)) {
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return ((PyComplexObject *)op)->cval.imag;
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} else {
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return 0.0;
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}
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}
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Py_complex
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PyComplex_AsCComplex(op)
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PyObject *op;
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{
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Py_complex cv;
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if (PyComplex_Check(op)) {
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return ((PyComplexObject *)op)->cval;
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} else {
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cv.real = PyFloat_AsDouble(op);
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cv.imag = 0.;
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return cv;
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}
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}
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static void
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complex_dealloc(op)
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PyObject *op;
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{
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PyMem_DEL(op);
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}
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static void
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complex_buf_repr(buf, v)
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char *buf;
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PyComplexObject *v;
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{
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if (v->cval.real == 0.)
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sprintf(buf, "%.12gj", v->cval.imag);
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else
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sprintf(buf, "(%.12g%+.12gj)", v->cval.real, v->cval.imag);
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}
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static int
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complex_print(v, fp, flags)
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PyComplexObject *v;
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FILE *fp;
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int flags; /* Not used but required by interface */
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{
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char buf[100];
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complex_buf_repr(buf, v);
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fputs(buf, fp);
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return 0;
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}
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static PyObject *
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complex_repr(v)
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PyComplexObject *v;
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{
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char buf[100];
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complex_buf_repr(buf, v);
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return PyString_FromString(buf);
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}
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static int
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complex_compare(v, w)
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PyComplexObject *v, *w;
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{
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/* Note: "greater" and "smaller" have no meaning for complex numbers,
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but Python requires that they be defined nevertheless. */
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Py_complex i, j;
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i = v->cval;
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j = w->cval;
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if (i.real == j.real && i.imag == j.imag)
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return 0;
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else if (i.real != j.real)
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return (i.real < j.real) ? -1 : 1;
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else
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return (i.imag < j.imag) ? -1 : 1;
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}
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static long
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complex_hash(v)
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PyComplexObject *v;
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{
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double intpart, fractpart;
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int expo;
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long hipart, x;
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/* This is designed so that Python numbers with the same
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value hash to the same value, otherwise comparisons
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of mapping keys will turn out weird */
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#ifdef MPW /* MPW C modf expects pointer to extended as second argument */
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{
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extended e;
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fractpart = modf(v->cval.real, &e);
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intpart = e;
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}
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#else
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fractpart = modf(v->cval.real, &intpart);
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#endif
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if (fractpart == 0.0 && v->cval.imag == 0.0) {
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if (intpart > 0x7fffffffL || -intpart > 0x7fffffffL) {
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/* Convert to long int and use its hash... */
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PyObject *w = PyLong_FromDouble(v->cval.real);
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if (w == NULL)
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return -1;
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x = PyObject_Hash(w);
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Py_DECREF(w);
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return x;
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}
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x = (long)intpart;
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}
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else {
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fractpart = frexp(fractpart, &expo);
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fractpart = fractpart * 2147483648.0; /* 2**31 */
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hipart = (long)fractpart; /* Take the top 32 bits */
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fractpart = (fractpart - (double)hipart) * 2147483648.0;
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/* Get the next 32 bits */
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x = hipart + (long)fractpart + (long)intpart + (expo << 15);
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/* Combine everything */
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if (v->cval.imag != 0.0) { /* Hash the imaginary part */
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/* XXX Note that this hashes complex(x, y)
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to the same value as complex(y, x).
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Still better than it used to be :-) */
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#ifdef MPW
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{
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extended e;
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fractpart = modf(v->cval.imag, &e);
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intpart = e;
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}
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#else
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fractpart = modf(v->cval.imag, &intpart);
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#endif
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fractpart = frexp(fractpart, &expo);
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fractpart = fractpart * 2147483648.0; /* 2**31 */
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hipart = (long)fractpart; /* Take the top 32 bits */
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fractpart =
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(fractpart - (double)hipart) * 2147483648.0;
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/* Get the next 32 bits */
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x ^= hipart + (long)fractpart +
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(long)intpart + (expo << 15);
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/* Combine everything */
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}
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}
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if (x == -1)
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x = -2;
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return x;
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}
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static PyObject *
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complex_add(v, w)
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PyComplexObject *v;
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PyComplexObject *w;
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{
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Py_complex result;
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PyFPE_START_PROTECT("complex_add", return 0)
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result = c_sum(v->cval,w->cval);
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PyFPE_END_PROTECT(result)
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return PyComplex_FromCComplex(result);
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}
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static PyObject *
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complex_sub(v, w)
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PyComplexObject *v;
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PyComplexObject *w;
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{
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Py_complex result;
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PyFPE_START_PROTECT("complex_sub", return 0)
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result = c_diff(v->cval,w->cval);
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PyFPE_END_PROTECT(result)
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return PyComplex_FromCComplex(result);
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}
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static PyObject *
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complex_mul(v, w)
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PyComplexObject *v;
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PyComplexObject *w;
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{
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Py_complex result;
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PyFPE_START_PROTECT("complex_mul", return 0)
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result = c_prod(v->cval,w->cval);
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PyFPE_END_PROTECT(result)
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return PyComplex_FromCComplex(result);
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}
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static PyObject *
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complex_div(v, w)
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PyComplexObject *v;
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PyComplexObject *w;
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{
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Py_complex quot;
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PyFPE_START_PROTECT("complex_div", return 0)
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errno = 0;
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quot = c_quot(v->cval,w->cval);
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PyFPE_END_PROTECT(quot)
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if (errno == EDOM) {
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PyErr_SetString(PyExc_ZeroDivisionError, "complex division");
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return NULL;
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}
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return PyComplex_FromCComplex(quot);
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}
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static PyObject *
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complex_remainder(v, w)
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PyComplexObject *v;
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PyComplexObject *w;
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{
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Py_complex div, mod;
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errno = 0;
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div = c_quot(v->cval,w->cval); /* The raw divisor value. */
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if (errno == EDOM) {
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PyErr_SetString(PyExc_ZeroDivisionError, "complex remainder");
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return NULL;
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}
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div.real = floor(div.real); /* Use the floor of the real part. */
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div.imag = 0.0;
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mod = c_diff(v->cval, c_prod(w->cval, div));
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return PyComplex_FromCComplex(mod);
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}
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static PyObject *
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complex_divmod(v, w)
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PyComplexObject *v;
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PyComplexObject *w;
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{
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Py_complex div, mod;
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PyObject *d, *m, *z;
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errno = 0;
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div = c_quot(v->cval,w->cval); /* The raw divisor value. */
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if (errno == EDOM) {
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PyErr_SetString(PyExc_ZeroDivisionError, "complex divmod()");
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return NULL;
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}
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div.real = floor(div.real); /* Use the floor of the real part. */
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div.imag = 0.0;
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mod = c_diff(v->cval, c_prod(w->cval, div));
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d = PyComplex_FromCComplex(div);
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m = PyComplex_FromCComplex(mod);
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z = Py_BuildValue("(OO)", d, m);
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Py_XDECREF(d);
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Py_XDECREF(m);
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return z;
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}
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static PyObject *
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complex_pow(v, w, z)
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PyComplexObject *v;
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PyObject *w;
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PyComplexObject *z;
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{
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Py_complex p;
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Py_complex exponent;
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long int_exponent;
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if ((PyObject *)z!=Py_None) {
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PyErr_SetString(PyExc_ValueError, "complex modulo");
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return NULL;
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}
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PyFPE_START_PROTECT("complex_pow", return 0)
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errno = 0;
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exponent = ((PyComplexObject*)w)->cval;
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int_exponent = (long)exponent.real;
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if (exponent.imag == 0. && exponent.real == int_exponent)
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p = c_powi(v->cval,int_exponent);
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else
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p = c_pow(v->cval,exponent);
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PyFPE_END_PROTECT(p)
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if (errno == ERANGE) {
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PyErr_SetString(PyExc_ValueError,
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"0.0 to a negative or complex power");
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return NULL;
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}
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return PyComplex_FromCComplex(p);
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}
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static PyObject *
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complex_neg(v)
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PyComplexObject *v;
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{
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Py_complex neg;
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neg.real = -v->cval.real;
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neg.imag = -v->cval.imag;
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return PyComplex_FromCComplex(neg);
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}
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static PyObject *
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complex_pos(v)
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PyComplexObject *v;
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{
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Py_INCREF(v);
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return (PyObject *)v;
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}
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static PyObject *
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complex_abs(v)
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PyComplexObject *v;
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{
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double result;
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PyFPE_START_PROTECT("complex_abs", return 0)
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result = hypot(v->cval.real,v->cval.imag);
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PyFPE_END_PROTECT(result)
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return PyFloat_FromDouble(result);
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}
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static int
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complex_nonzero(v)
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PyComplexObject *v;
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{
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return v->cval.real != 0.0 || v->cval.imag != 0.0;
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}
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static int
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complex_coerce(pv, pw)
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PyObject **pv;
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PyObject **pw;
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{
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Py_complex cval;
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cval.imag = 0.;
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if (PyInt_Check(*pw)) {
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cval.real = (double)PyInt_AsLong(*pw);
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*pw = PyComplex_FromCComplex(cval);
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Py_INCREF(*pv);
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return 0;
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}
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else if (PyLong_Check(*pw)) {
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cval.real = PyLong_AsDouble(*pw);
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*pw = PyComplex_FromCComplex(cval);
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Py_INCREF(*pv);
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return 0;
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}
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else if (PyFloat_Check(*pw)) {
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cval.real = PyFloat_AsDouble(*pw);
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*pw = PyComplex_FromCComplex(cval);
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Py_INCREF(*pv);
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return 0;
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}
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return 1; /* Can't do it */
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}
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static PyObject *
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complex_int(v)
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PyObject *v;
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{
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PyErr_SetString(PyExc_TypeError,
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"can't convert complex to int; use e.g. int(abs(z))");
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return NULL;
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}
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static PyObject *
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complex_long(v)
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PyObject *v;
|
|
{
|
|
PyErr_SetString(PyExc_TypeError,
|
|
"can't convert complex to long; use e.g. long(abs(z))");
|
|
return NULL;
|
|
}
|
|
|
|
static PyObject *
|
|
complex_float(v)
|
|
PyObject *v;
|
|
{
|
|
PyErr_SetString(PyExc_TypeError,
|
|
"can't convert complex to float; use e.g. abs(z)");
|
|
return NULL;
|
|
}
|
|
|
|
static PyObject *
|
|
complex_conjugate(self, args)
|
|
PyObject *self;
|
|
PyObject *args;
|
|
{
|
|
Py_complex c;
|
|
if (!PyArg_ParseTuple(args, ""))
|
|
return NULL;
|
|
c = ((PyComplexObject *)self)->cval;
|
|
c.imag = -c.imag;
|
|
return PyComplex_FromCComplex(c);
|
|
}
|
|
|
|
static PyMethodDef complex_methods[] = {
|
|
{"conjugate", complex_conjugate, 1},
|
|
{NULL, NULL} /* sentinel */
|
|
};
|
|
|
|
|
|
static PyObject *
|
|
complex_getattr(self, name)
|
|
PyComplexObject *self;
|
|
char *name;
|
|
{
|
|
if (strcmp(name, "real") == 0)
|
|
return (PyObject *)PyFloat_FromDouble(self->cval.real);
|
|
else if (strcmp(name, "imag") == 0)
|
|
return (PyObject *)PyFloat_FromDouble(self->cval.imag);
|
|
else if (strcmp(name, "__members__") == 0)
|
|
return Py_BuildValue("[ss]", "imag", "real");
|
|
return Py_FindMethod(complex_methods, (PyObject *)self, name);
|
|
}
|
|
|
|
static PyNumberMethods complex_as_number = {
|
|
(binaryfunc)complex_add, /*nb_add*/
|
|
(binaryfunc)complex_sub, /*nb_subtract*/
|
|
(binaryfunc)complex_mul, /*nb_multiply*/
|
|
(binaryfunc)complex_div, /*nb_divide*/
|
|
(binaryfunc)complex_remainder, /*nb_remainder*/
|
|
(binaryfunc)complex_divmod, /*nb_divmod*/
|
|
(ternaryfunc)complex_pow, /*nb_power*/
|
|
(unaryfunc)complex_neg, /*nb_negative*/
|
|
(unaryfunc)complex_pos, /*nb_positive*/
|
|
(unaryfunc)complex_abs, /*nb_absolute*/
|
|
(inquiry)complex_nonzero, /*nb_nonzero*/
|
|
0, /*nb_invert*/
|
|
0, /*nb_lshift*/
|
|
0, /*nb_rshift*/
|
|
0, /*nb_and*/
|
|
0, /*nb_xor*/
|
|
0, /*nb_or*/
|
|
(coercion)complex_coerce, /*nb_coerce*/
|
|
(unaryfunc)complex_int, /*nb_int*/
|
|
(unaryfunc)complex_long, /*nb_long*/
|
|
(unaryfunc)complex_float, /*nb_float*/
|
|
0, /*nb_oct*/
|
|
0, /*nb_hex*/
|
|
};
|
|
|
|
PyTypeObject PyComplex_Type = {
|
|
PyObject_HEAD_INIT(&PyType_Type)
|
|
0,
|
|
"complex",
|
|
sizeof(PyComplexObject),
|
|
0,
|
|
(destructor)complex_dealloc, /*tp_dealloc*/
|
|
(printfunc)complex_print, /*tp_print*/
|
|
(getattrfunc)complex_getattr, /*tp_getattr*/
|
|
0, /*tp_setattr*/
|
|
(cmpfunc)complex_compare, /*tp_compare*/
|
|
(reprfunc)complex_repr, /*tp_repr*/
|
|
&complex_as_number, /*tp_as_number*/
|
|
0, /*tp_as_sequence*/
|
|
0, /*tp_as_mapping*/
|
|
(hashfunc)complex_hash, /*tp_hash*/
|
|
};
|
|
|
|
#endif
|