Primitive Ideals in the Enveloping Algebra of the Lie Superalgebra sl(2, 1)

A well-known theorem of Duflo, the ``annihilation theorem,'' claims that the annihilator of a Verma module in the enveloping algebra of a complex semisimple Lie algebra is centrally generated. For the Lie superalgebra osp(1, 2l ), this result does not hold. In this article, we introduce a ``correct'

In this paper we study the two-sided ideals of the enveloping algebra U s Ž Ž .. U sl K over an arbitrary field K of characteristic zero. Starting with two basic 2 ideas, that an irreducible Lie module is generated by its highest weight vector and that the Lie module structure of U comes from its ri

If ᒄ is a classical simple Lie superalgebra ᒄ / P n , the enveloping algebra Ž . Ž Ž .. U ᒄ is a prime ring and hence has a simple artinian ring of quotients Q U ᒄ by Ž Ž .. Goldie's Theorem. We show that if ᒄ has Type I then Q U ᒄ is a matrix ring Ž Ž .. Ž . over Q U ᒄ . On the other hand, if ᒄ s