Rainbow Induced Subgraphs in Replication Graphs

Abstract

A graph G is called a replication graph of a graph H if G is obtained from H by replacing vertices of H by arbitrary cliques of vertices and then replacing each edge in H by all the edges between corresponding cligues. For a given graph H the R(H) is the minimal number of vertices of a replication graph G of H such that every proper vertex coloring of G contains a rainbow induced subgraph isomorphic to H having exactly one vertex in each replication clique of G. We prove some bounds for R for some classes of graphs and compute some exact values. Also some experimental results obtained by a computer search are presented and conjectures based on them are formulated.