Cross-intersecting families and primitivity of symmetric systems

Abstract

Let X be a finite set and p⊂eq 2X, the power set of X, satisfying three conditions: (a) p is an ideal in 2X, that is, if A∈ p and B⊂ A, then B∈ p; (b) For A∈ 2X with |A|≥ 2, A∈ p if \x,y\∈ p for any x,y∈ A with x≠ y; (c) \x\∈ p for every x∈ X. The pair (X, p) is called a symmetric system if there is a group transitively acting on X and preserving the ideal p. A family \A1,A2,…,Am\⊂eq 2X is said to be a cross-p-family of X if \a, b\∈ p for any a∈ Ai and b∈ Aj with i≠ j. We prove that if (X, p) is a symmetric system and \A1,A2,…,Am\⊂eq 2X is a cross-p-family of X, then \[Σi=1m|Ai|≤\ arraycl |X| & if m≤ |X|α(X,\, p), \\ m\, α(X,\, p) & if m≥ |X|α(X,\, p), array.\] where α(X,\, p)=\|A|:A∈ p\. This generalizes Hilton's theorem on cross-intersecting families of finite sets, and provides analogs for cross-t-intersecting families of finite sets, finite vector spaces and permutations, etc. Moreover, the primitivity of symmetric systems is introduced to characterize the optimal families.