Michael Giudici, Cheryl E. Praeger, Pablo Spiga
Published 2013-11-15Version 1
We conjecture that if $G$ is a finite primitive group and if $g$ is an element of $G$, then either the element $g$ has a cycle of length equal to its order, or for some $r,m$ and $k$, the group $G\leq S_m\wr S_r$, preserving a product structure of $r$ direct copies of the natural action of $S_m$ or $A_m$ on $k$-sets. In this paper we reduce this conjecture to the case that $G$ is an almost simple group with socle a classical group.
Comments: Dedicated to the memory of our friend \'Akos Seress 22 pages: Conjecture 1.2 has been recently solved (paper is in preparation)
A generalization of Sims conjecture for finite primitive groups and two point stabilizers in primitive groups
Maps, simple groups, and arc-transitive graphs
Probabilistic Generation of Finite Almost Simple Groups
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