Annihilators of highest weight sl(∞)-modules

Abstract

We give a criterion for the annihilator in U(sl(∞)) of a simple highest weight sl(∞)-module to be nonzero. As a consequence we show that, in contrast with the case of sl(n), the annihilator in U(sl(∞)) of any simple highest weight sl(∞)-module is integrable, i.e., coincides with the annihilator of an integrable sl(∞)-module. Furthermore, we define the class of ideal Borel subalgebras of sl(∞), and prove that any prime integrable ideal in U(sl(∞)) is the annihilator of a simple b0-highest weight module, where b0 is any fixed ideal Borel subalgebra of sl(∞). This latter result is an analogue of the celebrated Duflo Theorem for primitive ideals.