The Ramsey number of books

Abstract

We show that in every two-colouring of the edges of the complete graph KN there is a monochromatic Kk which can be extended in at least (1 + ok(1))2-kN ways to a monochromatic Kk+1. This result is asymptotically best possible, as may be seen by considering a random colouring. Equivalently, defining the book Bn(k) to be the graph consisting of n copies of Kk+1 all sharing a common Kk, we show that the Ramsey number r(Bn(k)) = 2k n + ok(n). In this form, our result answers a question of Erdos, Faudree, Rousseau and Schelp and establishes an asymptotic version of a conjecture of Thomason.