The Burness-Giudici Conjecture on Some Primitive Groups with Socle PSU(3,q)
Abstract
Let G be a transitive permutation group on with two points α, β∈ such that Gα Gβ=1. The Saxl graph (G) of the pair (G,) is the graph with vertex set , while two vertices α', β' are adjacent if and only if Gα' Gβ'=1. It was conjectured by Burness and Giudici that the Saxl graph (G) of any primitive permutation group G has the property that any two vertices have a common neighbor. We focused on proving the conjecture for all primitive groups G whose socle is a simple group of Lie-type of rank 1, that is, those with soc(G)∈ \PSL(2,q), PSU(3,q), Ree(q), Sz(q)\. The case of soc(G)=PSL(2,q) has been published in two papers. This paper will address most cases where soc(G)=PSU(3,q), with the exception of a particularly intricate configuration in which the point stabilizer contains PSO(3,q). That specific configuration has been treated in a separate paper.
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