Ramsey numbers of long even cycles versus books

Abstract

For any positive integers k and n, let Bn(k) be the book graph consisting of n copies of the complete graph Kk+1 sharing a common Kk. Let Cm be a cycle of length m. Prior work by Allen, uczak, Polcyn, and Zhang (2023) established the Ramsey number R(Cm,Bn(1)) for all sufficiently large even integer m = (n9/10). Recently, Hu, Lin, uczak, Ning, and Peng (2025) obtained the exact value of R(Cm,Bn(2)) under the same asymptotic conditions. A natural problem is to determine the exact value of R(Cm,Bn(k)) for each fixed k3 under similar conditions. This paper provides a complete solution to this problem. The lower bound is proved by an explicit construction, while the tight upper bound is established by analyzing the corresponding Ramsey graph using semi-random ideas.