The Gill-Guillot commuting graph for sporadic and related groups
Abstract
Let G be a finite group and C a normal subset of G. The Gill-Guillot graph has vertices C and x, y ∈ C are adjacent if and only if x and y commute and \xy-1,x-1y\ C is non-empty. We study the connectivity of this graph for quasisimple groups with G/Z(G) a sporadic simple group and for certain simple groups with exceptional Schur multiplier.
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