Finite simple groups have many classes of p-elements
Abstract
For an element x of a finite group T, the Aut(T)-class of x is the set \ xσ σ∈ Aut(T)\. We prove that the order |T| of a finite nonabelian simple group T is bounded above by a function of the parameter m(T), where m(T) is the maximum, over all primes p, of the number of Aut(T)-classes of elements of T of p-power order. This bound is a substantial generalisation of results of Pyber, and of H\'ethelyi and K\"ulshammer, and it has implications for relative Brauer groups of finite extensions of global fields.
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