Bounded weight modules for basic classical Lie superalgebras at infinity

Abstract

We classify simple bounded weight modules over the complex simple Lie superalgebras sl(∞ |∞) and osp (m | 2n), when at least one of m and n equals ∞. For osp (m | 2n) such modules are of spinor-oscillator type, i.e., they combine into one the known classes of spinor o (m)-modules and oscillator-type sp (2n)-modules. In addition, we characterize the category of bounded weight modules over osp (m | 2n) (under the assumption \, osp (m | 2n) = ∞) by reducing its study to already known categories of representations of sp (2n), where n possibly equals ∞. When classifying simple bounded weight sl(∞ |∞)-modules, we prove that every such module is integrable over one of the two infinite-dimensional ideals of the Lie algebra sl(∞ |∞)0. We finish the paper by establishing some first facts about the category of bounded weight sl (∞ |∞)-modules.

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