Homomorphism Complexes and k-Cores
Abstract
We prove that the topological connectivity of a graph homomorphism complex Hom(G,Km) is at least m-D(G)-2, where D(G)=H⊂eq Gδ(H). This is a strong generalization of a theorem of Cuki\'c and Kozlov, in which D(G) is replaced by the maximum degree (G). It also generalizes the graph theoretic bound for chromatic number, (G)≤ D(G)+1, as (G)=\ m:Hom(G,Km)≠\. Furthermore, we use this result to examine homological phase transitions in the random polyhedral complexes Hom(G(n,p),Km) when p=c/n for a fixed constant c > 0.
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