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lo-array-gripes.cc: Remove FIXME's related to buffer size. * lo-array-gripes.cc: Remove FIXME's related to buffer size. Shorten sprintf buffers from 100 to 64 characters (still well more than 19 required). Use 'const' decorator on constant value for clarity. Remove extra space between variable and array bracket.
author Rik <rik@octave.org>
date Mon, 12 Oct 2015 21:13:47 -0700
parents df437a52bcaf
children
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## Copyright (C) 2000-2015 Paul Kienzle
##
## 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/>.

## -*- texinfo -*-
## @deftypefn  {Function File} {@var{B} =} spdiags (@var{A})
## @deftypefnx {Function File} {[@var{B}, @var{d}] =} spdiags (@var{A})
## @deftypefnx {Function File} {@var{B} =} spdiags (@var{A}, @var{d})
## @deftypefnx {Function File} {@var{A} =} spdiags (@var{v}, @var{d}, @var{A})
## @deftypefnx {Function File} {@var{A} =} spdiags (@var{v}, @var{d}, @var{m}, @var{n})
## A generalization of the function @code{diag}.
##
## Called with a single input argument, the nonzero diagonals @var{d} of
## @var{A} are extracted.
##
## With two arguments the diagonals to extract are given by the vector @var{d}.
##
## The other two forms of @code{spdiags} modify the input matrix by replacing
## the diagonals.  They use the columns of @var{v} to replace the diagonals
## represented by the vector @var{d}.  If the sparse matrix @var{A} is
## defined then the diagonals of this matrix are replaced.  Otherwise a
## matrix of @var{m} by @var{n} is created with the diagonals given by the
## columns of @var{v}.
##
## Negative values of @var{d} represent diagonals below the main diagonal, and
## positive values of @var{d} diagonals above the main diagonal.
##
## For example:
##
## @example
## @group
## spdiags (reshape (1:12, 4, 3), [-1 0 1], 5, 4)
##    @result{} 5 10  0  0
##       1  6 11  0
##       0  2  7 12
##       0  0  3  8
##       0  0  0  4
## @end group
## @end example
##
## @seealso{diag}
## @end deftypefn

function [B, d] = spdiags (v, d, m, n)

  if (nargin < 1 || nargin > 4)
    print_usage ();
  endif

  if (nargin == 1 || nargin == 2)
    ## extract nonzero diagonals of A into B,d
    [nr, nc] = size (v);
    [i, j] = find (v);

    if (nargin == 1)
      ## d contains the active diagonals
      d = unique (j-i);
    endif

    ## FIXME: Maybe this could be done faster using [i,j,v] = find (v)
    ##        and then massaging the indices i, j.  However, some
    ##        benchmarking has shown that diag() written in C++ makes
    ##        the following code faster even with the for loop.
    Brows = min (nr, nc);
    B = zeros (Brows, length (d));
    for k = 1:length (d)
      dn = d(k);
      if (dn <= -nr || dn > nc)
        continue;
      endif
      dv = diag (v, dn);
      len = rows (dv);
      ## Put sub/super-diagonals in the right place based on matrix size (MxN)
      if (nr >= nc)
        if (dn > 0)
          offset = Brows - len + 1;
          B(offset:Brows, k) = dv;
        else
          B(1:len, k) = dv;
        endif
      else
        if (dn < 0)
          offset = Brows - len + 1;
          B(offset:Brows, k) = dv;
        else
          B(1:len, k) = dv;
        endif
      endif
    endfor

  elseif (nargin == 3)
    ## Replace specific diagonals d of m with v,d
    [nr, nc] = size (m);
    A = spdiags (m, d);
    B = m - spdiags (A, d, nr, nc) + spdiags (v, d, nr, nc);

  else
    ## Create new matrix of size mxn using v,d
    [j, i, v] = find (v);
    if (m >= n)
      offset = max (min (d(:), n-m), 0);
    else
      offset = d(:);
    endif
    j = j(:) + offset(i(:));
    i = j - d(:)(i(:));
    idx = i > 0 & i <= m & j > 0 & j <= n;
    B = sparse (i(idx), j(idx), v(idx), m, n);

  endif

endfunction


%!test
%! [B,d] = spdiags (magic (3));
%! assert (d, [-2 -1 0 1 2]');
%! assert (B, [4 3 8 0 0
%!             0 9 5 1 0
%!             0 0 2 7 6]);
%! B = spdiags (magic (3), [-2 1]);
%! assert (B, [4 0; 0 1; 0 7]);

## Test zero filling for supra- and super-diagonals
%!test
%! ## Case 1: M = N
%! A = sparse (zeros (3,3));
%! A(1,3) = 13;
%! A(3,1) = 31;
%! [B, d] = spdiags (A);
%! assert (d, [-2 2]');
%! assert (B, [31 0; 0 0; 0 13]);
%! assert (spdiags (B, d, 3,3), A)

%!test
%! ## Case 1: M > N
%! A = sparse (zeros (4,3));
%! A(1,3) = 13;
%! A(3,1) = 31;
%! [B, d] = spdiags (A);
%! assert (d, [-2 2]');
%! assert (B, [31 0; 0 0; 0 13]);
%! assert (spdiags (B, d, 4,3), A)

%!test
%! ## Case 1: M < N
%! A = sparse (zeros (3,4));
%! A(1,3) = 13;
%! A(3,1) = 31;
%! [B, d] = spdiags (A);
%! assert (d, [-2 2]');
%! assert (B, [0 13; 0 0; 31 0]);
%! assert (spdiags (B, d, 3,4), A)

%!assert (spdiags (zeros (1,0),1,1,1), sparse (0))
%!assert (spdiags (zeros (0,1),1,1,1), sparse (0))
%!assert (spdiags ([0.5 -1 0.5], 0:2, 1, 1), sparse (0.5))

## Test input validation
%!error spdiags ()
%!error spdiags (1,2,3,4,5)