Derangements in non-Frobenius groups
Abstract
We prove that if G is a transitive permutation group of sufficiently large degree n, then either G is primitive and Frobenius, or the proportion of derangements in G is larger than 1/(2n1/2). This is sharp, generalizes substantially bounds of Cameron--Cohen and Guralnick--Wan, and settles conjectures of Guralnick--Tiep and Bailey--Cameron--Giudici--Royle in large degree. We also give an application to coverings of varieties over finite fields.
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