From 19fb1ba90b56e120514c98e87fc59bb1635eed29 Mon Sep 17 00:00:00 2001 From: vrouvrea Date: Wed, 30 Mar 2016 09:26:51 +0000 Subject: Cubical complex for new doxygen version git-svn-id: svn+ssh://scm.gforge.inria.fr/svnroot/gudhi/branches/Doxygen_for_GUDHI_1.3.0@1083 636b058d-ea47-450e-bf9e-a15bfbe3eedb Former-commit-id: 77e7fa96f9ed2f2ccd9f65bb1f6b325737f863f5 --- src/Bitmap_cubical_complex/doc/Gudhi_Cubical_Complex_doc.h | 2 +- 1 file changed, 1 insertion(+), 1 deletion(-) (limited to 'src/Bitmap_cubical_complex/doc/Gudhi_Cubical_Complex_doc.h') diff --git a/src/Bitmap_cubical_complex/doc/Gudhi_Cubical_Complex_doc.h b/src/Bitmap_cubical_complex/doc/Gudhi_Cubical_Complex_doc.h index cde0b2fc..be4caaad 100644 --- a/src/Bitmap_cubical_complex/doc/Gudhi_Cubical_Complex_doc.h +++ b/src/Bitmap_cubical_complex/doc/Gudhi_Cubical_Complex_doc.h @@ -76,7 +76,7 @@ namespace Cubical_complex { * directions, allows to determine, dimension, neighborhood, boundary and coboundary of every cube \f$C \in * \mathcal{K}\f$. * - * \image html "bitmapAllCubes.png" "Cubical complex. + * \image html "Cubical_complex_representation.png" Cubical complex. * * Note that the cubical complex in the figure above is, in a natural way, a product of one dimensional cubical * complexes in \f$\mathbb{R}\f$. The number of all cubes in each direction is equal \f$2n+1\f$, where \f$n\f$ is the -- cgit v1.2.3