A Complete Intersection Theorem for Large Permutation Groups
Abstract
A family of permutations is called t-intersecting if any two permutations in the family agree on at least t elements. We prove that there exists n0 ∈ N such that for any n>n0 and any 1 ≤ t ≤ n, the maximum size of a t-intersecting family in Sn is obtained by one of the families Fn,t,r=\σ∈ Sn: |Fixed(σ) \1,2,…,t+2r\|≥ t+r\, where Fixed(σ) is the set of fixed points of σ. This proves an analogue of the classical Complete Intersection Theorem for large permutation groups, thus providing an essentially complete solution of the Deza-Frankl intersection problem for permutations (1977).
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