On existence of normal p-complement of finite groups with restrictions on the conjugacy class sizes
Abstract
The greatest power of a prime p dividing the natural number n will be denoted by np. Let IndG(g)=|G:CG(g)|. Suppose that G is a finite group and p is a prime. We prove that if there exists an integer α>0 such that IndG(a)p∈ \1,pα\ for every a of G and a p-element x∈ G such that IndG(x)p>1, then G includes a normal p-complement.
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