Color isomorphic even cycles and a related Ramsey problem

Abstract

In this paper, we first study a new extremal problem recently posed by Conlon and Tyomkyn~(arXiv: 2002.00921). Given a graph H and an integer k≥slant 2, let fk(n,H) be the smallest number of colors c such that there exists a proper edge-coloring of the complete graph Kn with c colors containing no k vertex-disjoint color-isomorphic copies of H. Using algebraic properties of polynomials over finite fields, we give an explicit proper edge-coloring of Kn and show that fk(n, C4)=(n) when k≥slant 3 and n→∞. The methods we used in the edge-coloring may be of some independent interest. We also consider a related generalized Ramsey problem. For given graphs G and H, let r(G,H,q) be the minimum number of edge-colors (not necessarily proper) of G, such that the edges of every copy of H⊂eq G together receive at least q distinct colors. Establishing the relation to the Tur\'an number of specified bipartite graphs, we obtain some general lower bounds for r(Kn,n,Ks,t,q) with a broad range of q.