On Ramsey goodness of K2,n versus cycles

Abstract

A graph G is called H-good if R(G,H)=(|G|-1)((H)-1)+σ(H), where σ(H) denotes the size of the smallest color class in a (H)-coloring of H. In Ramsey theory, it is an interesting problem to study whether a graph G is H-good or not. In this article, we study the Ramsey goodness of the pair (K2,n,Cm), which naturally lies between the classical star-cycle and book-cycle problems. We prove that equation* R(K2,n,C\m,m+1\)=m+1. equation* for all m 2n+1, and consequently establish that equation* R(K2,n,Cm)=m+1. equation* for all m 3n+4. This proves that Cm is K2,n-good in this range and improves a particular case of a result on the Ramsey goodness by Pokrovskiy and Sudakov. Further, we provide a construction of a graph that disproves the Cm-goodness of K2,n for all even m satisfying n≥ m+2.