Edge-coloring a graph G so that every copy of a graph H has an odd color class

Abstract

Recently, Alon introduced the notion of an H-code for a graph H: a collection of graphs on vertex set [n] is an H-code if it contains no two members whose symmetric difference is isomorphic to H. Let DH(n) denote the maximum possible cardinality of an H-code, and let dH(n)=DH(n)/2n 2. Alon observed that a lower bound on dH(n) can be obtained by attaining an upper bound on the number of colors needed to edge-color Kn so that every copy of H has an odd color class. Motivated by this observation, we define g(G,H) to be the minimum number of colors needed to edge-color a graph G so that every copy of H has an odd color class. We prove g(Kn,K5) no(1) and g(Kn,n, C4)= n/2+o(n). The first result shows dK5(n) 1no(1) and was obtained independently in arXiv:2306.14682.