Bounding the number of p'-degrees from below
Abstract
Let G be a finite group of order divisible by a prime p and let P∈p(G). We prove a recent conjecture by Hung stating that |p'(G)|≥ (P/P')-1p-1+2p-1-1. Let a≥ 2 be an integer and suppose that pa does not exceed the exponent of the center of P. We then also show that the number of conjugacy classes of elements of G for which pa is the exact p-part of their order is at least pa-1.
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