On colorings of the Boolean lattice avoiding a rainbow copy of a poset

Abstract

Let F(n,k) (f(n,k)) denote the maximum possible size of the smallest color class in a (partial) k-coloring of the Boolean lattice Bn that does not admit a rainbow antichain of size k. The value of F(n,3) and f(n,2) has been recently determined exactly. We prove that for any fixed k if n is large enough, then F(n,k),f(n,k)=2(1/2+o(1))n holds. We also introduce the general functions for any poset P and integer c |P|: let F(n,c,P) (f(n,c,P)) denote the the maximum possible size of the smallest color class in a (partial) c-coloring of the Boolean lattice Bn that does not admit a rainbow copy of P. We consider the first instances of this general problem.