Rational conjugacy classes and rational characters for some finite simple groups

Abstract

If G is a finite group, an irreducible complex-valued character is called rational if (g) is rational for all g∈ G. Also, a conjugacy class xG is called rational, if for all irreducible complex-valued character , the value (xG) is rational. We prove that for q, a power of prime, the group PSL2(q) has same number of rational characters and rational conjugacy classes. Furthermore, we verify that this equality holds for all finite simple groups whose character tables appear in the ATLAS of Finite Groups, except for the Tits group.

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