Boolean lattice without small rainbow subposets

Abstract

A Boolean lattice Bn=(2X, ≤) is the power set of an n-element ground set X equipped with inclusion relation. For two posets P and Q, we say that Q contains an induced copy of P if there exists an injection f : P Q such that f(X) f(Y) if and only if X Y in P. A k-coloring is exact if all colors are used at least once. For posets Q and P, the Boolean Gallai-Ramsey number GRk(Q:P) is defined as the smallest n such that any exact k-coloring of the sets in Bn contains either a rainbow induced copy of Q or a monochromatic induced copy of P and the Boolean rainbow Ramsey number RR(Q:P) is defined as the smallest n such that any coloring of the sets in Bn contains either a rainbow induced copy of Q or a monochromatic induced copy of P. In this paper, we first study the structural properties of exact k-colorings of the sets in Boolean lattice without rainbow induced copy of small posets. As the application of these results, we give exact values and some bounds of Boolean Gallai-Ramsey numbers and Boolean rainbow Ramsey numbers, which improve a result of Chen, Cheng, Li, and Liu in 2020 and give an answer of a question proposed by Chang, Gerbner, Li, Methuku, Nagy, Patk\'os, and Vizer in 2022.