Fixed point ratios for finite primitive groups and applications
Abstract
Let G be a finite primitive permutation group on a set and recall that the fixed point ratio of an element x ∈ G, denoted fpr(x), is the proportion of points in fixed by x. Fixed point ratios in this setting have been studied for many decades, finding a wide range of applications. In this paper, we are interested in comparing fpr(x) with the order of x. Our main theorem classifies the triples (G,,x) as above with the property that x has prime order r and fpr(x) > 1/(r+1). There are several applications. Firstly, we extend earlier work of Guralnick and Magaard by determining the primitive permutation groups of degree m with minimal degree at most 2m/3. Secondly, our main result plays a key role in recent work of the authors (together with Moret\'o and Navarro) on the commuting probability of p-elements in finite groups. Finally, we use our main theorem to investigate the minimal index of a primitive permutation group, which allows us to answer a question of Bhargava.
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