Stability for t-intersecting families of permutations

Abstract

A family of permutations (A ⊂ Sn) is said to be (t)-intersecting if any two permutations in (A) agree on at least (t) points, i.e. for any (σ, π ∈ A), (|\i ∈ [n]: σ(i)=π(i)\| ≥ t). It was recently proved by Friedgut, Pilpel and the author that for (n) sufficiently large depending on (t), a (t)-intersecting family (A ⊂ Sn) has size at most ((n-t)!), with equality only if (A) is a coset of the stabilizer of (t) points (or `(t)-coset' for short), proving a conjecture of Deza and Frankl. Here, we first obtain a rough stability result for (t)-intersecting families of permutations, namely that for any (t ∈ N) and any positive constant (c), if (A ⊂ Sn) is a (t)-intersecting family of permutations of size at least (c(n-t)!), then there exists a (t)-coset containing all but at most a (O(1/n))-fraction of (A). We use this to prove an exact stability result: for (n) sufficiently large depending on (t), if (A ⊂ Sn) is a (t)-intersecting family which is not contained within a (t)-coset, then (A) is at most as large as the family D & = & \σ ∈ Sn: σ(i)=i ∀ i ≤ t, σ(j)=j for some j > t+1\ && \(1 t+1),(2 t+1),...,(t t+1)\ which has size ((1-1/e+o(1))(n-t)!). Moreover, if (A) is the same size as (D) then it must be a `double translate' of (D), meaning that there exist (π,τ ∈ Sn) such that (A=π D τ). We also obtain an analogous result for (t)-intersecting families in the alternating group (An).