Partitioning the power set of [n] into Ck-free parts

Abstract

We show that for n ≥ 3, n 5, in any partition of P(n), the set of all subsets of [n]=\1,2,…,n\, into 2n-2-1 parts, some part must contain a triangle --- three different subsets A,B,C⊂eq [n] such that A B, A C, and B C have distinct representatives. This is sharp, since by placing two complementary pairs of sets into each partition class, we have a partition into 2n-2 triangle-free parts. We also address a more general Ramsey-type problem: for a given graph G, find (estimate) f(n,G), the smallest number of colors needed for a coloring of P(n), such that no color class contains a Berge-G subhypergraph. We give an upper bound for f(n,G) for any connected graph G which is asymptotically sharp (for fixed k) when G=Ck, Pk, Sk, a cycle, path, or star with k edges. Additional bounds are given for G=C4 and G=S3.