On Engel groups, nilpotent groups, rings, braces and the Yang-Baxter equation

Abstract

It is shown that over an arbitrary field there exists a nil algebra R whose adjoint group Ro is not an Engel group. This answers a question by Amberg and Sysak from 1997 [5] and answers related questions from [3, 44]. The case of an uncountable field also answers a recent question by Zelmanov. In [38], Rump introduced braces and radical chains An+1=A· An and A(n+1)=A(n)· A of a brace A. We show that the adjoint group Ao of a finite right brace is a nilpotent group if and only if A(n)=0 for some n. We also show that the adjoint group of Ao of a finite left brace A is a nilpotent group if and only if An=0 for some n. Moreover, if Ao is a nilpotent group then A is the direct sum of braces whose cardinatities are powers of prime numbers. Notice that Ao is sometimes called the multiplicative group of a brace A (for example in [13]). We also introduce a chain of ideals A[n] of a left brace A and then use it to investigate braces which satisfy An=0 and A(m)=0 for some m, n (Theorems 2, 3). In Section 2 we describe connections between our results and braided groups and the Yang-Baxter equation. It is worth noticing that by a result by Gateva-Ivanova [17] braces are in one-to-one correspondence with braided groups with involutive braided operators.