On U(h)-free modules of finite rank over sl(2)

Abstract

We study sl(2)-modules that are free of finite rank over U( h), where h is a fixed Cartan subalgebra of sl(2). These modules form a natural class of non-weight modules. The coherent families obtained from this class via the weighting functor are identified. We also study a distinguished class of indecomposable U( h)-free modules defined in terms of Jordan blocks and give a recursive description of their socle filtrations. Finally, we apply the general results to exponential modules arising from the first Weyl algebra and obtain simplicity criteria for these modules.