Mercurial > octave-nkf
view scripts/specfun/betaln.m @ 20595:c1a6c31ac29a
eliminate more simple uses of error_state
* ov-classdef.cc: Eliminate simple uses of error_state.
| author | John W. Eaton <jwe@octave.org> |
|---|---|
| date | Tue, 06 Oct 2015 00:20:02 -0400 |
| parents | 9fc020886ae9 |
| children |
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## Copyright (C) 1998-2015 Nicol N. Schraudolph ## ## 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 {Mapping Function} {} betaln (@var{a}, @var{b}) ## Compute the natural logarithm of the Beta function for real inputs @var{a} ## and @var{b}. ## ## @code{betaln} is defined as ## @tex ## $$ ## {\rm betaln} (a, b) = \ln (B (a,b)) \equiv \ln ({\Gamma (a) \Gamma (b) \over \Gamma (a + b)}). ## $$ ## @end tex ## @ifnottex ## ## @example ## betaln (a, b) = log (beta (a, b)) ## @end example ## ## @end ifnottex ## and is calculated in a way to reduce the occurrence of underflow. ## ## The Beta function can grow quite large and it is often more useful to work ## with the logarithm of the output rather than the function directly. ## @seealso{beta, betainc, betaincinv, gammaln} ## @end deftypefn ## Author: Nicol N. Schraudolph <nic@idsia.ch> ## Created: 06 Aug 1998 ## Keywords: log beta special function function retval = betaln (a, b) if (nargin != 2) print_usage (); endif if (! isreal (a) || ! isreal (b)) error ("betaln: A and B must be real"); elseif (! size_equal (a, b) && numel (a) != 1 && numel (b) != 1) error ("betaln: A and B must have consistent sizes"); endif retval = gammaln (a) + gammaln (b) - gammaln (a + b); endfunction %!assert (betaln (3,4), log (beta (3,4)), eps) ## Test input validation %!error betaln () %!error betaln (1) %!error betaln (1,2,3) %!error <A and B must be real> betaln (1i, 2) %!error <A and B must be real> betaln (2, 1i) %!error <A and B must have consistent sizes> betaln ([1 2], [1 2 3]) %!error <A and B must have consistent sizes> betaln ([1 2 3], [1 2]) %!error <A and B must have consistent sizes> betaln ([1 2 3], [1 2 3]')