Book Ramsey numbers via algebraic constructions

Abstract

Let Bn denote the book graph consisting of n triangles sharing a common edge. Few exact values of R(Bn,Bn) have been obtained since Rousseau and Sheehan (1978) proved, using Paley graphs, R(Bn, Bn) = 4n + 2 whenever 4n+1 is a prime power. In this paper, we obtain R(Bn,Bn)=4n+1 for infinitely many n by constructing new families of strongly regular graphs. Moreover, we prove that R(Bn-2,Bn) 4n-3 for every n 3 with n 6, removing the original condition n 2 3 due to Rousseau and Sheehan. In particular, if there exists a symmetric Hadamard matrix of order 2n-2 with all diagonal entries equal to 1, then R(Bn-2,Bn)=4n-3. As an application, we show that this equality holds for every n=22-1+1 with 1.