Reduced Power Graphs of PGLn(Fq)

Abstract

Given a group G, let us connect two non-identity elements by an edge if and only if one is a power of another. This gives a graph structure on G minus identity, called the reduced power graph. It is conjectured by Akbari and Ashrafi that if a non-abelian finite simple group has a connected reduced power graph, then it must be an alternating group. In this paper, we shall give a complete description of when the reduced power graphs of PGLn(Fq) are connected for all q and all n≥ 3. In particular, the conjectured by Akbari and Ashrafi is false. We shall also provide an upper bound in their diameters, and in case of disconnection, provide a description of all connected components.

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