On closed Ramsey numbers of small countable ordinals

Abstract

This paper is a contribution to the investigation of closed partition relations for pairs of countable ordinals. As our main result, we prove that \[ω4 · (n-2)+1 < Rcl(ω · n+1,3)<ω5\] for every integer n ≥ 3. This result significantly improves the existing upper and lower bounds for these closed Ramsey numbers. In addition, we prove that \[ωθcl (ωα,3)2\] whenever 1 ≤ α ≤ θ<ω1 satisfy θ < R(α,3). This result asymptotically improves the existing lower bounds for Rcl(ωn,3) and slightly strengthens the existing necessary condition for being a topological partition ordinal.