Classification of primitive ideals of U(o(∞)) and U(sp(∞))

Abstract

The purpose of this Ph.D. thesis is to study and classify primitive ideals of the enveloping algebras U(o(∞)) and U(sp(∞)). Let g(∞) denote any of the Lie algebras o(∞) or sp(∞). Then g(∞)=n≥ 2 g(2n) for g(2n)=o(2n) or g(2n)=sp(2n), respectively. We show that each primitive ideal I of U(g(∞)) is weakly bounded, i.e., I U(g(2n)) equals the intersection of annihilators of bounded weight g(2n)-modules. To every primitive ideal I of g(∞) we attach a unique irreducible coherent local system of bounded ideals, which is an analog of a coherent local system of finite-dimensional modules, as introduced earlier by A. Zhilinskii. As a result, primitive ideals of U(g(∞)) are parametrized by triples (x,y,Z) where x is a nonnegative integer, y is a nonnegative integer or half-integer, and Z is a Young diagram. In the case of o(∞), each primitive ideal is integrable, and our classification reduces to a classification of integrable ideals going back to A. Zhilinskii, A. Penkov and I. Petukhov. In the case of sp(∞), only 'half' of the primitive ideals are integrable, and nonintegrable primitive ideals correspond to triples (x,y,Z) where y is a half-integer.