Differential identities and polynomial growth of the codimensions

Abstract

Let A be an associative algebra over a field F of characteristic zero and let L be a Lie algebra over F. If L acts on A by derivations, then such an action determines an action of its universal enveloping algebra U(L) and in this case we refer to A as algebra with derivations or L-algebra. Here we give a characterization of the ideal of differential identities of finite dimensional L-algebras A in case the corresponding sequence of differential codimensions cnL (A), n≥ 1, is polynomially bounded. As a consequence, we also characterize L-algebras with multiplicities of the differential cocharacter bounded by a constant.