Simple modules over truncated current Lie algebras of the Witt algebra

Abstract

Let be an algebraically closed field of characteristic p>3, and let W denote the p-dimensional Witt algebra, the first example of a non-classical simple Lie algebra. For a non-negative integer , consider the associated truncated current Lie algebra W=W [t]/(t+1). In this paper, we first study simple W-modules having p-character of height at most one, and provide a complete classification of such modules up to isomorphism. We then investigate a family of simple W-modules whose p-characters have height greater than one.