Homotopy types of Hom complexes of graph homomorphisms whose codomains are square-free

Abstract

Given finite simple graphs G and H, the Hom complex Hom(G,H) is a polyhedral complex having the graph homomorphisms G H as the vertices. We determine the homotopy type of each connected component of Hom(G,H) when H is square-free, meaning that it does not contain the 4-cycle graph C4 as a subgraph. Specifically, for a connected G and a square-free H, we show that each connected component of Hom(G,H) is homotopy equivalent to a wedge sum of circles. We further show that, given any graph homomorphism f G H to a square-free H, one can determine the homotopy type of the connected component of Hom(G,H) containing f algorithmically.

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