Two-Term Polynomial Identities

Abstract

We study algebras satisfying a two-term multilinear identity, namely one of the form x1 ·s xn= q xσ(1) ·s xσ(n), where q is a parameter from the base field. We show that such algebras with q=1 and σ not fixing 1 or n are eventually commutative in the sense that the equality x1·s xk = xτ(1) ·s xτ(k) holds for k large enough and all permutations τ ∈ Sk. Calling the minimal such k the degree of eventual commutativity, we prove that k is never more than 2n-3, and that this bound is sharp. For various natural examples, we prove that k can be taken to be n+1 or n+2. In the case when q 1, we establish that the algebra must be nilpotent. We, moreover, demonstrate that if an algebra is eventually commutative of arbitrary characteristic, then it has a finite basis of its polynomial identities, thus confirming the Specht conjecture in this particular case.

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