Word problems for finite nilpotent groups
Abstract
Let be a word in variables. For a finite nilpotent group , a conjecture of Amit states that , where is the number of -tuples such that . Currently, this conjecture is known to be true for groups of nilpotency class 2. Here we consider a generalized version of Amit's conjecture, and prove that , where is a -value in , for finite groups of odd order and nilpotency class 2. If is a word in two variables, we further show that , where is a -value in for finite groups of nilpotency class 2. In addition, for a prime, we show that finite -groups , with two distinct irreducible complex character degrees, satisfy the generalized Amit conjecture for words with a natural number; that is, for a -value in we have . Finally, we discuss the related group properties of being rational and chiral, and show that every finite group of nilpotency class 2 is rational.
Cite
@article{arxiv.2005.03634,
title = {Word problems for finite nilpotent groups},
author = {Rachel D. Camina and Ainhoa Iniguez and Anitha Thillaisundaram},
journal= {arXiv preprint arXiv:2005.03634},
year = {2020}
}
Comments
9 pages