2012
DOI: 10.1016/j.patrec.2011.08.011
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Perfect discrete Morse functions on 2-complexes

Abstract: A bst r ac t This paper is focused on the study of perfect discrete Morse functions on a 2-simplicial complex. These are those discrete Morse functions such that the number of critical i-simplices coincides with the i-th Betti number of the complex. In particular, we establish conditions under which a 2-complex admits a perfect discrete Morse function and conversely, we get topological properties of a 2-complex admitting such kind of functions. This approach is more general than the known results in the litera… Show more

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Cited by 14 publications
(15 citation statements)
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“…A cell which is not critical is called regular. A discrete vector field V is a collection of pairs ðσ [20,22,16,21]) and perfect Morse functions, for which the number of critical i-cells coincides with the i-th Betti number of the complex [1].…”
Section: In Relation To Discrete Morse Theorymentioning
confidence: 99%
“…A cell which is not critical is called regular. A discrete vector field V is a collection of pairs ðσ [20,22,16,21]) and perfect Morse functions, for which the number of critical i-cells coincides with the i-th Betti number of the complex [1].…”
Section: In Relation To Discrete Morse Theorymentioning
confidence: 99%
“…This is the case of the Bing's house and the Dunce hat complexes, that are contractible but not collapsible (see (Ayala et al, 2010)). …”
Section: Discrete Morse Theory and Optimalitymentioning
confidence: 99%
“…This means that we are able to guarantee homological optimality (what is called perfection in the DMT context, see Ayala et al (2010)). Proof.…”
Section: Discrete Morse Theory and Optimalitymentioning
confidence: 99%
“…Notice that the converse is not true. In [2] an example of a 2-complex K with H 1 (K) = Z and not admitting Z-perfect discrete Morse functions is included. In particular, if the first fundamental group of a 2-complex is finite and non-trivial then it does not admit Z-perfect discrete Morse functions.…”
Section: Perfect Discrete Morse Functions On Graphs and 2-complexesmentioning
confidence: 99%
“…This situation strongly contrasts with the smooth case, where the existence of perfect functions on a manifold does not depend on the given triangulation. The main goal of this work, which is the continuation of the paper [2], consists on reducing the problem, initially stated on 3-manifolds, to 2-complexes. It is possible since we prove that a triangulation K of a 3-manifold admits a perfect discrete Morse function if and only if a spine of K admits such kind of function.…”
Section: Introductionmentioning
confidence: 99%