Jason Fulman, Robert Guralnick
Published 2002-08-03Version 1
We investigate the proportion of fixed point free permutations (derangements) in finite transitive permutation groups. This article is the first in a series where we prove a conjecture of Shalev that the proportion of such elements is bounded away from zero for a simple finite group. In fact, there are much stronger results. This article focuses on finite Chevalley groups of bounded rank. We also discuss derangements in algebraic groups and in more general primitive groups. These results have applications in questions about probabilistic generation of finite simple groups and maps between varieties over finite fields.
Comments: To appear in Proceedings of Durham Conference on Groups, Geometry, and Combinatorics (2001)
Bounds on the number and sizes of conjugacy classes in finite Chevalley groups with Applications to Derangements
On transitive sets of derangements in primitive groups
Groups generated by derangements
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