Simple Sr-homotopy types of Hom complexes and box complexes associated to r-graphs

Abstract

For a pair (H1,H2) of graphs, Lov\'asz introduced a polytopal complex called the Hom complex Hom(H1,H2), in order to estimate topological lower bounds for chromatic numbers of graphs. The definition is generalized to hypergraphs. Denoted by Krr the complete r-graph on r vertices. Given an r-graph H, we compare Hom(Krr,H) with the box complex Bedge(H), invented by Alon, Frankl and Lov\'asz. We verify that Hom(Krr,H) and Bedge(H), both are equipped with right actions of the symmetric group on r letters Sr, are of the same simple Sr-homotopy type.