On finite groups whose power graph is claw-free
Abstract
A graph is called claw-free if it contains no induced subgraph isomorphic to the complete bipartite graph K1, 3. The undirected power graph of a group G has vertices the elements of G, with an edge between g1 and g2 if one of the two cyclic subgroups g1, g2 is contained in the other. It is denoted by P(G). The reduced power graph, denoted by P*(G), is the subgraph of P(G) induced by the non-identity elements. The main purpose of this paper is to explore the finite groups whose reduced power graph is claw-free. In particular we prove that if P*(G) is claw-free, then either G is solvable or G is an almost simple group. In the second case the socle of G is isomorphic to PSL(2,q) for suitable choices of q. Finally we prove that if P*(G) is claw-free, then the order of G is divisible by at most 5 different primes.
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