Trichotomy and tKm-goodness of sparse graphs

Abstract

Let G be a connected graph with n vertices and n+k-2 edges and tKm denote the disjoint union of t complete graphs Km. In this paper, by developing a trichotomy for sparse graphs, we show that for given integers m 2 and t 1, there exists a positive constant c such that if 1 k cn2m-1 and n is large, then G is tKm-good, that is, the Ramsey number is \[ r(G, tKm)=(n-1)(m-1)+t\,. \] In particular, the above equality holds for any positive integers k, m, and t, provided n is large. The case t=1 was obtained by Burr, Erdos, Faudree, Rousseau, and Schelp (1980), and the case k=1 was established by Luo and Peng (2023).