On Lie nilpotent associative algebras

Abstract

Let G be a group generated by a set X. It is well known and easy to check that \[ [g1, g2, … ,gn] = 1 for all gi ∈ G [x1, x2, … , xn] =1 for all xi ∈ X. \] Let L be a Lie algebra generated by a set X. Then it is also well known and easy to check that \[ [h1, h2, … , hn] = 0 for all hi ∈ L [x1, x2, … ,xn] = 0 for all xi ∈ X. \] Now let A be a unital associative algebra generated by a set X. Then the assertion similar to the above does not hold: for n > 2, it is easy to find an algebra A with a generating set X such that [x1, x2, … ,xn] = 0 for all xi ∈ X but [a1, a2, … ,an] 0 for some ai ∈ A. However, we prove the following result. Let R be a unital associative and commutative ring such that 13 ∈ R. Let A be a unital associative R-algebra generated by a set X. Let X2 = \ x1 x2 xi ∈ X \ be the set of all products of 2 elements of X. Then \[ [a1, a2, … ,an] = 0 for all ai ∈ A [y1, y2, … , yn] =0 for all yi ∈ X X2. \] Moreover, one can assume that in the commutator [y1, y2, … , yn] above y1, yn ∈ X.