On the \(p\)-length and the Wielandt length of a finite \(p\)-soluble group

Authors

  • N. Su Sun Yatsen University, China
  • Y. Wang Sun Yatsen University, China

Keywords:

p-length, Wielandt length, nilpotent class, permutable

Abstract

The p-length of a finite p-soluble group is an important invariant parameter. The well-known Hall-Higman \py length theorem states that the p-length of a p-soluble group is upper-bounded by the nilpotent class of its Sylow \py subgroups. In this paper, we improve this result by giving a better estimation on the p-length of a p-soluble group in terms of other invariant parameters of its Sylow p-subgroups. 10.1017/S0004972713000026

Author Biographies

N. Su, Sun Yatsen University, China

School of Mathematics

Y. Wang, Sun Yatsen University, China

Full professor, School of Mathematics

Published

2013-09-27

Issue

Section

Articles