Groups with some arithmetic conditions on real class sizes
Abstract
Let G be a finite group. An element x in G is a real element if x is conjugate to its inverse in G. For x in G, the conjugacy class xG is said to be a real conjugacy class if every element of xG is real. We show that if 4 divides no real conjugacy class size of a finite group G, then G is solvable. We also study the structure of such groups in detail. This generalizes several results in the literature.
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