On A-Groups with the Same Index Set as a Nilpotent Group
Abstract
Let G be a finite group and N(G) be the set of conjugacy class sizes of G. For a prime p, let |G||p be the highest p-power dividing some element of N(G). and define |G|| = p∈ π(G)|G||p. G is said to be an A-group if all its Sylow subgroups are abelian. We prove that if G is an A-group such that N(G) contains |G||p for every p∈ π(G) as well as |G||, then G must be abelian. This result gives a positive answer to a question posed by Camina and Camina in 2006.
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