The structure of a finite group and the maximum π-index of its elements

Abstract

Given a set of primes π, the π-index of an element x of a finite group G is the π-part of the index of the centralizer of x in G. If π=\p\ is a singleton, we just say the p-index. If the π-index of x is equal to p1k1… pks, where p1,…,ps are distinct primes, then we set π(x)=k1+…+ks. In this short note, we study how the number επ(G)=\επ(x):x∈ G\ restricts the structure of the factor group G/Z(G) of G by its center. First, for a finite group G, we prove that φp(G/Z(G))≤εp(G), where φp(G/Z(G)) is the Frattini length of a Sylow p-subgroup of G/Z(G). Second, for a π-separable finite group G, we prove that lπ(G/Z(G))≤επ(G), where lπ(G/Z(G)) is the π-length of G/Z(G).

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