Mixed pairwise cross intersecting families (I)

Abstract

An (n, k1, …, kt)-cross intersecting system is a set of non-empty pairwise cross-intersecting families F1⊂[n] k1, F2⊂[n] k2, …, Ft⊂[n] kt with t≥ 2 and k1≥ k2≥ ·s ≥ kt. If an (n, k1, …, kt)-cross intersecting system contains at least two families which are cross intersecting freely and at least two families which are cross intersecting but not freely, then we say that the cross intersecting system is of mixed type. All previous studies are on non-mixed type, i.e, under the condition that n k1+k2. In this paper, we study for the first interesting mixed type, an (n, k1, …, kt)-cross intersecting system with k1+k3≤ n <k1+k2, i.e., families Fi⊂eq [n] ki and Fj⊂eq [n] kj are cross intersecting freely if and only if \i, j\=\1, 2\. Let M(n, k1, …, kt) denote the maximum sum of sizes of families in an (n, k1, …, kt)-cross intersecting system. We determine M(n, k1, …, kt) and characterize all extremal (n, k1, …, kt)-cross intersecting systems for k1+k3≤ n <k1+k2. We think that the characterization of maximal cross intersecting L-initial families and the unimodality of functions in this paper are interesting in their own, in addition to the extremal result. The most general condition on n is that n k1+kt. This paper provides foundation work for the solution to the most general condition n k1+kt.

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