Products of commutators in a Lie nilpotent associative algebra

Abstract

Let F be a field and let F X be the free unital associative algebra over F freely generated by an infinite countable set X = \x1, x2, … \. Define a left-normed commutator [a1, a2, …, an] recursively 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 F X generated by all commutators [a1, a2, …, an] (ai ∈ F X ). Let F be a field of characteristic 0. In 2008 Etingof, Kim and Ma conjectured that T(m) T(n) ⊂ T(m+n -1) if and only if m or n is odd. In 2010 Bapat and Jordan confirmed the "if" direction of the conjecture: if at least one of the numbers m, n is odd then T(m) T(n) ⊂ T(m + n -1). The aim of the present note is to confirm the "only if" direction of the conjecture. We prove that if m = 2 m' and n = 2 n' are even then T(m) T(n) T(m +n -1). Our result is valid over any field F.