The category of weight modules for symplectic oscillator Lie algebras

Abstract

The rank n symplectic oscillator Lie algebra gn is the semidirect product of the symplectic Lie algebra sp2n and the Heisenberg Lie algebra Hn. In this paper, we study weight modules with finite dimensional weight spaces over gn. When z≠ 0, it is shown that there is an equivalence between the full subcategory Ogn[ z] of the BGG category Ogn for gn and the BGG category Osp2n for sp2n. Then using the technique of localization and the structure of generalized highest weight modules, we also give the classification of simple weight modules over gn with finite-dimensional weight spaces.