The Boolean Rainbow Ramsey Number of Antichains, Boolean Posets, and Chains

Abstract

Motivated by the paper of Axenovich and Walzer [2], we study the Ramsey-type problems on the Boolean lattices. Given posets P and Q, we look for the smallest Boolean lattice BN such that any coloring on elements of BN must contain a monochromatic P or a rainbow Q. This number N is called the Boolean rainbow Ramsey number of P and Q in the paper. Particularly, we determine the exact values of the Boolean rainbow Ramsey number for P and Q being the antichains, the Boolean posets, or the chains. From these results, we also give some general upper and lower bounds of the Boolean rainbow Ramsey number for general P and Q in terms of the poset parameters.