Independence complexes and incidence graphs
DOI:
https://doi.org/10.11575/cdm.v12i1.62277Keywords:
Poset, Graph, Independent setAbstract
We show that the independence complex of the incidence graph ofa hypergraph is homotopy equivalent to the combinatorial Alexander dual of
the independence complex of the hypergraph, generalizing a result of Csorba.
As an application, we refine and generalize a result of Kawamura on a
relation between the homotopy types of the independence complex and
the edge covering complex of a graph.
References
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Peter Csorba.
Subdivision yields Alexander duality on independence complexes.
Electron. J. Combin., 16(2, Special volume in honor of Anders Bjorner):Research Paper 11, 7, 2009.
Jakob Jonsson.
On the topology of independence complexes of triangle-free graphs.
preprint.
Kazuhiro Kawamura.
Independence complexes and edge covering complexes via Alexander duality.
Electron. J. Combin., 18(1):Paper 39, 6, 2011.
Uwe Nagel and Victor Reiner.
Betti numbers of monomial ideals and shifted skew shapes.
Electron. J. Combin., 16(2, Special volume in honor of Anders Bjorner):Research Paper 3, 59, 2009.
Daniel Quillen.
Homotopy properties of the poset of nontrivial {$p$}-subgroups of a group.
Adv. in Math., 28(2):101--128, 1978.
James~W. Walker.
Canonical homeomorphisms of posets.
European Journal of Combinatorics, 9(2):97--107, 1988.
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