New bounds for numbers of primes in element orders of finite groups
Abstract
Let (n) denote the maximal number of different primes that may occur in the order of a finite solvable group G, all elements of which have orders divisible by at most n distinct primes. We show that (n)≤ 5n for all n≥ 1. As an application, we improve on a recent bound by Hung and Yang for arbitrary finite groups.
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