A classification of prime graphs of pseudo-solvable groups

Abstract

The prime graph (G) of a finite group G (also known as the Gruenberg-Kegel graph) has as its vertices the prime divisors of |G|, and p-q is an edge in (G) if and only if G has an element of order pq. Since their inception in the 1970s these graphs have been studied extensively; however, completely classifying the possible prime graphs for larger families of groups remains a difficult problem. For solvable groups such a classification was found in 2015. In this paper we go beyond solvable groups for the first time and characterize prime graphs of a more general class of groups we call pseudo-solvable. These are groups whose composition factors are either cyclic or A5. The classification is based on two conditions: the vertices \2,3,5\ form a triangle in (G) or \p,3,5\ form a triangle for some prime p≠ 2.

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