On some products of commutators in an associative ring

Abstract

Let A be a unital associative ring and let T(k) be the two-sided ideal of A generated by all commutators [a1, a2, … , ak] (ai ∈ A) where [a1, a2] = a1 a2 - a2 a1, [a1, … , ak-1, ak] = [ [a1, … , ak-1], ak ] (k >2). It has been known that, if either m or n is odd then \[ 6 \, [a1, a2, … , am] [b1, b2, … , bn] ∈ T(m+n-1) \] for all ai, bj ∈ A. This was proved by Sharma and Srivastava in 1990 and independently rediscovered later (with different proofs) by various authors. The aim of our note is to give a simple proof of the following result: if at least one of the integers m,n is odd then, for all ai, bj ∈ A, \[ 3 \, [a1, a2, … , am] [b1, b2, … , bn] ∈ T(m+n-1). \] Since it has been known that, in general, \[ [a1, a2, a3] [b1, b2] T(4), \] our result cannot be improved further for all m, n such that at least one of them is odd.