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We study the concept of star clusters in simplicial complexes, which was introduced by Barmak in 2013, by relating it with the structure of hypergraphs that correspond to the simplicial complexes. This implies that for a hypergraph H with a vertex v that is not isolated and not contained in an induced Berge cycle of length 3, there exists a hypergraph H' with fewer vertices than H such that the independence complex of H is homotopy equivalent to the suspension of the independence complex of H'. As an application, we also prove that if a hypergraph has no Berge cycle of length 0 mod 3, then the sum of all reduced Betti numbers of its independence complex is at most 1.
Jinha Kim (Mon,) studied this question.
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