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author | vrouvrea <vrouvrea@636b058d-ea47-450e-bf9e-a15bfbe3eedb> | 2016-03-09 07:01:55 +0000 |
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committer | vrouvrea <vrouvrea@636b058d-ea47-450e-bf9e-a15bfbe3eedb> | 2016-03-09 07:01:55 +0000 |
commit | 1967dc923b9bb24edd52a848b7991539779dbe8b (patch) | |
tree | 78afc9cc4c5e0d9b565c9ca22b3bb63f2c381422 /src/Persistent_cohomology/include/gudhi/Persistent_cohomology.h | |
parent | 9a6c0725419f82a978b27cc3708b5a2f375853a2 (diff) |
Add header and footer to generated documentation in order to fit with the web site.
Add a package overview on top page.
Remove text that was redundant with the web site.
git-svn-id: svn+ssh://scm.gforge.inria.fr/svnroot/gudhi/branches/Doxygen_for_GUDHI_1.3.0@1035 636b058d-ea47-450e-bf9e-a15bfbe3eedb
Former-commit-id: 95d6c0e2f0ed8389620c27c03e37d441f93787ee
Diffstat (limited to 'src/Persistent_cohomology/include/gudhi/Persistent_cohomology.h')
-rw-r--r-- | src/Persistent_cohomology/include/gudhi/Persistent_cohomology.h | 9 |
1 files changed, 0 insertions, 9 deletions
diff --git a/src/Persistent_cohomology/include/gudhi/Persistent_cohomology.h b/src/Persistent_cohomology/include/gudhi/Persistent_cohomology.h index 643b810c..3c331f0f 100644 --- a/src/Persistent_cohomology/include/gudhi/Persistent_cohomology.h +++ b/src/Persistent_cohomology/include/gudhi/Persistent_cohomology.h @@ -63,15 +63,6 @@ namespace persistent_cohomology { composed of three elements: topological spaces, their homology groups and an evolution scheme. - The theory of homology consists in attaching to a topological space a sequence of - (homology) groups, - capturing global topological features - like connected components, holes, cavities, etc. Persistent homology studies the evolution - -- birth, life and death -- of - these features when the topological space is changing. Consequently, the theory is essentially - composed of three elements: - topological spaces, their homology groups and an evolution scheme. - <DT>Topological Spaces:</DT> Topological spaces are represented by simplicial complexes. Let \f$V = \{1, \cdots ,|V|\}\f$ be a set of <EM>vertices</EM>. |