Simple homotopy of flag simplicial complexes and contractible contractions of graphs

Abstract

In his work on molecular spaces, Ivashchenko introduced the notion of an I-contractible transformation on a graph G, a family of addition/deletion operations on its vertices and edges. Chen, Yau, and Yeh used these operations to define the I-homotopy type of a graph, and showed that I-contractible transformations preserve the simple homotopy type of C(G), the clique complex of G. In other work, Boulet, Fieux, and Jouve introduced the notion of s-homotopy of graphs to characterize the simple homotopy type of a flag simplicial complex. They proved that s-homotopy preserves I-homotopy, and asked whether the converse holds. In this note, we answer their question in the affirmative, concluding that graphs G and H are I-homotopy equivalent if and only if C(G) and C(H) are simple homotopy equivalent. We also show that a finite graph G is I-contractible if and only if C(G) is contractible, which answers a question posed by the first author, Espinoza, Fr\'ias-Armenta, and Hern\'andez. We use these ideas to give a characterization of simple homotopy for arbitrary simplicial complexes in terms of links of vertices.

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