Lie algebra modules which are locally finite over the semi-simple part

Abstract

For a finite-dimensional Lie algebra L over C with a fixed Levi decomposition L = g r where g is semi-simple, we investigate L-modules which decompose, as g-modules, into a direct sum of simple finite-dimensional g-modules with finite multiplicities. We call such modules g-Harish-Chandra modules. We give a complete classification of simple g-Harish-Chandra modules for the Takiff Lie algebra associated to g = sl2, and for the Schr\"odinger Lie algebra, and obtain some partial results in other cases. An adapted version of Enright's and Arkhipov's completion functors plays a crucial role in our arguments. Moreover, we calculate the first extension groups of infinite-dimensional simple g-Harish-Chandra modules and their annihilators in the universal enveloping algebra, for the Takiff sl2 and the Schr\"odinger Lie algebra. In the general case, we give a sufficient condition for the existence of infinite-dimensional simple g-Harish-Chandra modules.