Mercurial > hg > octave-nkf
view libinterp/corefcn/fft2.cc @ 20762:f90c8372b7ba
eliminate many more simple uses of error_state
* Cell.cc, __ichol__.cc, __ilu__.cc, balance.cc, bsxfun.cc, colloc.cc,
det.cc, dlmread.cc, dynamic-ld.cc, eig.cc, fft.cc, fft2.cc, fftn.cc,
gcd.cc, getgrent.cc, getpwent.cc, givens.cc, hess.cc, input.cc,
levenshtein.cc, load-path.cc, lookup.cc, ls-mat-ascii.cc, ls-mat4.cc,
lsode.cc, lu.cc, max.cc, md5sum.cc, mex.cc, pager.cc, pinv.cc,
pr-output.cc, qz.cc, schur.cc, sparse.cc, sqrtm.cc, str2double.cc,
strfns.cc, sub2ind.cc, sysdep.cc, time.cc, toplev.cc, tril.cc,
tsearch.cc, typecast.cc, __init_gnuplot__.cc, __magick_read__.cc,
__osmesa_print__.cc, amd.cc, audiodevinfo.cc, dmperm.cc, fftw.cc,
symrcm.cc, ov-base-diag.cc, ov-base-sparse.cc, ov-base.cc,
ov-bool-sparse.cc, ov-builtin.cc, ov-complex.cc, ov-cx-diag.cc,
ov-cx-mat.cc, ov-cx-sparse.cc, ov-fcn-handle.cc, ov-fcn-inline.cc,
ov-float.cc, ov-flt-complex.cc, ov-flt-cx-diag.cc, ov-flt-cx-mat.cc,
ov-flt-re-diag.cc, ov-flt-re-mat.cc, ov-lazy-idx.cc, ov-mex-fcn.cc,
ov-perm.cc, ov-range.cc, ov-re-diag.cc, ov-re-mat.cc, ov-re-sparse.cc,
ov-scalar.cc, ov-str-mat.cc, op-bm-b.cc, op-bm-bm.cc, op-sbm-b.cc,
op-sbm-bm.cc, op-str-m.cc, op-str-s.cc, oct-parse.in.yy, pt-cbinop.cc,
pt-colon.cc, pt-decl.cc, pt-exp.cc, pt-id.cc, pt-misc.cc,
pt-select.cc, pt-unop.cc: Eliminate simple uses of error_state.
| author | John W. Eaton <jwe@octave.org> |
|---|---|
| date | Mon, 05 Oct 2015 19:29:36 -0400 |
| parents | b2100e1659ac |
| children |
line wrap: on
line source
/* Copyright (C) 1997-2015 David Bateman Copyright (C) 1996-1997 John W. Eaton This file is part of Octave. Octave is free software; you can redistribute it and/or modify it under the terms of the GNU General Public License as published by the Free Software Foundation; either version 3 of the License, or (at your option) any later version. Octave is distributed in the hope that it will be useful, but WITHOUT ANY WARRANTY; without even the implied warranty of MERCHANTABILITY or FITNESS FOR A PARTICULAR PURPOSE. See the GNU General Public License for more details. You should have received a copy of the GNU General Public License along with Octave; see the file COPYING. If not, see <http://www.gnu.org/licenses/>. */ #ifdef HAVE_CONFIG_H #include <config.h> #endif #include "lo-mappers.h" #include "defun.h" #include "error.h" #include "gripes.h" #include "oct-obj.h" #include "utils.h" // This function should be merged with Fifft. #if defined (HAVE_FFTW) #define FFTSRC "@sc{fftw}" #else #define FFTSRC "@sc{fftpack}" #endif static octave_value do_fft2 (const octave_value_list &args, const char *fcn, int type) { octave_value retval; int nargin = args.length (); if (nargin < 1 || nargin > 3) { print_usage (); return retval; } octave_value arg = args(0); dim_vector dims = arg.dims (); octave_idx_type n_rows = -1; if (nargin > 1) { double dval = args(1).double_value (); if (xisnan (dval)) error ("%s: number of rows (N) cannot be NaN", fcn); else { n_rows = NINTbig (dval); if (n_rows < 0) error ("%s: number of rows (N) must be greater than zero", fcn); } } octave_idx_type n_cols = -1; if (nargin > 2) { double dval = args(2).double_value (); if (xisnan (dval)) error ("%s: number of columns (M) cannot be NaN", fcn); else { n_cols = NINTbig (dval); if (n_cols < 0) error ("%s: number of columns (M) must be greater than zero", fcn); } } for (int i = 0; i < dims.length (); i++) if (dims(i) < 0) return retval; if (n_rows < 0) n_rows = dims(0); else dims(0) = n_rows; if (n_cols < 0) n_cols = dims(1); else dims(1) = n_cols; if (dims.all_zero () || n_rows == 0 || n_cols == 0) { if (arg.is_single_type ()) return octave_value (FloatMatrix ()); else return octave_value (Matrix ()); } if (arg.is_single_type ()) { if (arg.is_real_type ()) { FloatNDArray nda = arg.float_array_value (); nda.resize (dims, 0.0); retval = (type != 0 ? nda.ifourier2d () : nda.fourier2d ()); } else { FloatComplexNDArray cnda = arg.float_complex_array_value (); cnda.resize (dims, 0.0); retval = (type != 0 ? cnda.ifourier2d () : cnda.fourier2d ()); } } else { if (arg.is_real_type ()) { NDArray nda = arg.array_value (); nda.resize (dims, 0.0); retval = (type != 0 ? nda.ifourier2d () : nda.fourier2d ()); } else if (arg.is_complex_type ()) { ComplexNDArray cnda = arg.complex_array_value (); cnda.resize (dims, 0.0); retval = (type != 0 ? cnda.ifourier2d () : cnda.fourier2d ()); } else gripe_wrong_type_arg (fcn, arg); } return retval; } DEFUN (fft2, args, , "-*- texinfo -*-\n\ @deftypefn {Built-in Function} {} fft2 (@var{A})\n\ @deftypefnx {Built-in Function} {} fft2 (@var{A}, @var{m}, @var{n})\n\ Compute the two-dimensional discrete Fourier transform of @var{A} using\n\ a Fast Fourier Transform (FFT) algorithm.\n\ \n\ The optional arguments @var{m} and @var{n} may be used specify the number of\n\ rows and columns of @var{A} to use. If either of these is larger than the\n\ size of @var{A}, @var{A} is resized and padded with zeros.\n\ \n\ If @var{A} is a multi-dimensional matrix, each two-dimensional sub-matrix\n\ of @var{A} is treated separately.\n\ @seealso{ifft2, fft, fftn, fftw}\n\ @end deftypefn") { return do_fft2 (args, "fft2", 0); } DEFUN (ifft2, args, , "-*- texinfo -*-\n\ @deftypefn {Built-in Function} {} ifft2 (@var{A})\n\ @deftypefnx {Built-in Function} {} ifft2 (@var{A}, @var{m}, @var{n})\n\ Compute the inverse two-dimensional discrete Fourier transform of @var{A}\n\ using a Fast Fourier Transform (FFT) algorithm.\n\ \n\ The optional arguments @var{m} and @var{n} may be used specify the number of\n\ rows and columns of @var{A} to use. If either of these is larger than the\n\ size of @var{A}, @var{A} is resized and padded with zeros.\n\ \n\ If @var{A} is a multi-dimensional matrix, each two-dimensional sub-matrix\n\ of @var{A} is treated separately\n\ @seealso{fft2, ifft, ifftn, fftw}\n\ @end deftypefn") { return do_fft2 (args, "ifft2", 1); } /* %% Author: David Billinghurst (David.Billinghurst@riotinto.com.au) %% Comalco Research and Technology %% 02 May 2000 %!test %! M = 16; %! N = 8; %! %! m = 5; %! n = 3; %! %! x = 2*pi*(0:1:M-1)/M; %! y = 2*pi*(0:1:N-1)/N; %! sx = cos (m*x); %! sy = sin (n*y); %! s = kron (sx',sy); %! S = fft2 (s); %! answer = kron (fft (sx)', fft (sy)); %! assert (S, answer, 4*M*N*eps); %% Author: David Billinghurst (David.Billinghurst@riotinto.com.au) %% Comalco Research and Technology %% 02 May 2000 %!test %! M = 12; %! N = 7; %! %! m = 3; %! n = 2; %! %! x = 2*pi*(0:1:M-1)/M; %! y = 2*pi*(0:1:N-1)/N; %! %! sx = cos (m*x); %! sy = cos (n*y); %! %! S = kron (fft (sx)', fft (sy)); %! answer = kron (sx', sy); %! s = ifft2 (S); %! %! assert (s, answer, 30*eps); %% Author: David Billinghurst (David.Billinghurst@riotinto.com.au) %% Comalco Research and Technology %% 02 May 2000 %!test %! M = 16; %! N = 8; %! %! m = 5; %! n = 3; %! %! x = 2*pi*(0:1:M-1)/M; %! y = 2*pi*(0:1:N-1)/N; %! sx = single (cos (m*x)); %! sy = single (sin (n*y)); %! s = kron (sx', sy); %! S = fft2 (s); %! answer = kron (fft (sx)', fft (sy)); %! assert (S, answer, 4*M*N*eps ("single")); %% Author: David Billinghurst (David.Billinghurst@riotinto.com.au) %% Comalco Research and Technology %% 02 May 2000 %!test %! M = 12; %! N = 7; %! %! m = 3; %! n = 2; %! %! x = single (2*pi*(0:1:M-1)/M); %! y = single (2*pi*(0:1:N-1)/N); %! %! sx = cos (m*x); %! sy = cos (n*y); %! %! S = kron (fft (sx)', fft (sy)); %! answer = kron (sx', sy); %! s = ifft2 (S); %! %! assert (s, answer, 30*eps ("single")); */