The Burness-Giudici Conjecture on Primitive Groups with Socle PSU(3,q)
Abstract
Let G be a transitive permutation group on a set , and suppose Gα Gβ=1 for some distinct α, β∈. The Saxl graph (G) of (G, ) is defined as the graph with vertex set , where two vertices α', β' are adjacent if and only if Gα' Gβ'=1. Burness and Giudici conjectured that for every primitive permutation group G, its Saxl graph has the property that any two vertices share a common neighbor. We focus on proving the conjecture for all primitive groups G whose socle is a simple group of Lie-type of rank 1; that is, soc(G)∈ \PSL(2,q),PSU(3,q), Ree(q),Sz(q)\. The case soc(G)=PSL(2,q) has been treated in two earlier papers. The purpose of the present paper is to settle the case soc(G)=PSU(3,q). To finsh this work, we draw on methods from abstract- and permutation- group theory, finite unitary geometry, probabilistic approach, number theory (employing Weil's bound), and, most importantly, algebraic combinatorics, which provides us some key ideas.
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