Long monochromatic paths and cycles in 2-edge-colored multipartite graphs

Abstract

We solve four similar problems: For every fixed s and large n, we describe all values of n1,…,ns such that for every 2-edge-coloring of the complete s-partite graph Kn1,…,ns there exists a monochromatic (i) cycle C2n with 2n vertices, (ii) cycle C≥ 2n with at least 2n vertices, (iii) path P2n with 2n vertices, and (iv) path P2n+1 with 2n+1 vertices. This implies a generalization for large n of the conjecture by Gy\'arf\'as, Ruszink\'o, S\'arkozy and Szemer\'edi that for every 2-edge-coloring of the complete 3-partite graph Kn,n,n there is a monochromatic path P2n+1. An important tool is our recent stability theorem on monochromatic connected matchings.