ON VERBAL SUBGROUPS IN RESIDUALLY FINITE GROUPS

Authors

  • Pavel Shumyatsky
  • Jhone Caldeira

Keywords:

Residually Finite Groups, Restricted Burnside Problem, Varieties

Abstract

The following theorem is proved. Let m, k and n be positive integers. There exists a number r depending only on m, k and n such that if G is any residually finite group satisfying the condition that the product of any r commutators of the form w=[x^m, y_1,...y_k] is of order dividing n, then the verbal subgroup of G corresponding to the word w is locally finite.

Published

2011-10-19

Issue

Section

Articles