Intersecting Families of Permutations
Abstract
A set of permutations I ⊂ Sn is said to be k-intersecting if any two permutations in I agree on at least k points. We show that for any k ∈ N, if n is sufficiently large depending on k, then the largest k-intersecting subsets of Sn are cosets of stabilizers of k points, proving a conjecture of Deza and Frankl. We also prove a similar result concerning k-cross-intersecting subsets. Our proofs are based on eigenvalue techniques and the representation theory of the symmetric group.
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