English

Homomorphism Complexes and k-Cores

Combinatorics 2016-02-16 v2 Algebraic Topology

Abstract

We prove that the topological connectivity of a graph homomorphism complex Hom(G,KmG,K_m) is at least mD(G)2m-D(G)-2, where D(G)=maxHGδ(H)\displaystyle D(G)=\max_{H\subseteq G}\delta(H). This is a strong generalization of a theorem of Cuki\'{c} and Kozlov, in which D(G)D(G) is replaced by the maximum degree Δ(G)\Delta(G). It also generalizes the graph theoretic bound for chromatic number, χ(G)D(G)+1\displaystyle\chi(G)\leq D(G)+1, as χ(G)=min{m:Hom(G,Km)}\displaystyle\chi(G)=\min\{ m:\text{Hom}(G,K_m)\neq\varnothing\}. Furthermore, we use this result to examine homological phase transitions in the random polyhedral complexes Hom(G(n,p),Km)(G(n,p),K_m) when p=c/np=c/n for a fixed constant c>0c > 0.

Keywords

Cite

@article{arxiv.1601.07854,
  title  = {Homomorphism Complexes and k-Cores},
  author = {Greg Malen},
  journal= {arXiv preprint arXiv:1601.07854},
  year   = {2016}
}
R2 v1 2026-06-22T12:38:47.896Z