Random permutations acting on k--tuples have near--optimal spectral gap for k=poly(n)
Abstract
We extend Friedman's theorem to show that, for any fixed r>1, a random 2r--regular Schreier graph associated with the action of r uniformly random permutations of [n] on kn--tuples of distinct elements in [n] has a near--optimal spectral gap with high probability, provided kn≤ n120-ε. Previously this was known only for k--tuples where k is fixed. In fact, we prove the stronger result of strong convergence of random permutations in irreducible representations of quasi--exponential dimension. Along the way, we give a new bound for the expected stable irreducible character of a random permutation obtained via a word map, showing that E[μ(w(σ1,…,σr))]=O(1μ)=O(n-k), where k is the number of boxes outside the first row of the Young diagram μ, solving one aspect of a conjecture of Hanany and Puder. We obtain this bound using an extension of Wise's w--cycle conjecture.
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