On finite groups with few automorphism orbits
Abstract
Denote by ω(G) the number of orbits of the action of Aut(G) on the finite group G. We prove that if G is a finite nonsolvable group in which ω(G) ≤slant 5, then G is isomorphic to one of the groups A5,A6,PSL(2,7) or PSL(2,8). We also consider the case when ω(G) = 6 and show that if G is a nonsolvable finite group with ω(G) = 6, then either G PSL(3,4) or there exists a characteristic elementary abelian 2-subgroup N of G such that G/N A5.
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