Analogues of Katona's and Milner's Theorems for two families

Abstract

Let n>s>0 be integers, X an n-element set and A, B⊂ 2X two families. If |A B| s for all A∈A, B∈ B, then A and B are called cross s-union. Assuming that neither A nor B is empty, we prove several best possible bounds. In particular, we show that |A|+|B| 1+Σ0 i sni. Supposing n 2s and A,B are antichains, we show that |A|+|B| n1+ns-1 unless A=\\ or B=\\. An analogous result for three families is established as well.