Relations in universal Lie nilpotent associative algebras of class 4

Abstract

Let K be a unital associative and commutative ring and let K X be the free unital associative K-algebra on a non-empty set X of free generators. Define a left-normed commutator [a1, a2, … , an] inductively by [a1, a2] = a1 a2 - a2 a1, [a1, … , an-1, an] = [[a1, … , an-1], an] (n 3). For n 2, let T(n) be the two-sided ideal in K X generated by all commutators [a1,a2, … , an] ( ai ∈ K X ). It can be easily seen that the ideal T(2) is generated (as a two-sided ideal in K X ) by the commutators [x1, x2] (xi ∈ X). It is well-known that T(3) is generated by the polynomials [x1,x2,x3] and [x1,x2][x3,x4] + [x1,x3][x2,x4] (xi ∈ X). A similar generating set for T(4) contains 3 types of polynomials in xi ∈ X if 13 ∈ K and 5 types if 13 K. In the present article we exhibit a generating set for T(5) that contains 8 types of polynomials in xi ∈ X.