On the off-diagonal unordered Erdos-Rado numbers

Abstract

Erdos and Rado [P. Erdos, R. Rado, A combinatorial theorem, Journal of the London Mathematical Society 25 (4) (1950) 249-255] introduced the Canonical Ramsey numbers er(t) as the minimum number n such that every edge-coloring of the ordered complete graph Kn contains either a monochromatic, rainbow, upper lexical, or lower lexical clique of order t. Richer [D. Richer, Unordered canonical Ramsey numbers, Journal of Combinatorial Theory Series B 80 (2000) 172-177] introduced the unordered asymmetric version of the Canonical Ramsey numbers CR(s,r) as the minimum n such that every edge-coloring of the (unorderd) complete graph Kn contains either a rainbow clique of order r, or an orderable clique of order s. We show that CR(s,r) = O(r3/ r)s-2, which, up to the multiplicative constant, matches the known lower bound and improves the previously best known bound CR(s,r) = O(r3/ r)s-1 by Jiang [T. Jiang, Canonical Ramsey numbers and proporly colored cycles, Discrete Mathematics 309 (2009) 4247-4252]. We also obtain bounds on the further variant ER(m,,r), defined as the minimum n such that every edge-coloring of the (unorderd) complete graph Kn contains either a monochromatic Km, lexical K, or rainbow Kr.