Word problems for finite nilpotent groups

Abstract: Let w be a word in k variables. For a finite nilpotent group G, a conjecture of Amit states that N w (1) ≥ |G| k−1 , where N w (1) is the number of k-tuples (g 1 , . . . , g k ) ∈ G (k) such that w(g 1 , . . . , g k ) = 1. 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 N w (g) ≥ |G| k−2 , where g is a w-value in G, for finite groups G of odd order and nilpotency class 2. If w is a word in two variabl… Show more