An Eventown Result for Permutations

Abstract

A family of permutations F ⊂eq Sn is even-cycle-intersecting if σ π-1 has an even cycle for all σ,π ∈ F. We show that if F ⊂eq Sn is an even-cycle-intersecting family of permutations, then |F| ≤ 2n-1, and that equality holds when n is a power of 2 and F is a double-translate of a Sylow 2-subgroup of Sn. This result can be seen as an analogue of the classical eventown problem for subsets and it confirms a conjecture of J\'anos K\"orner on maximum reversing families of the symmetric group. Along the way, we show that the canonically intersecting families of Sn are also the extremal odd-cycle-intersecting families of Sn for all even n. While the latter result has less combinatorial significance, its proof uses an interesting new character-theoretic identity that might be of independent interest in algebraic combinatorics.