Categories of integrable sl(∞)-, o(∞)-, sp(∞)-modules

Abstract

We investigate several categories of integrable sl(∞)-, o(∞)-, sp(∞)-modules. In particular, we prove that the category of integrable sl(∞)-, o(∞)-, sp(∞)-modules with finite-dimensional weight spaces is semisimple. The most interesting category we study is the category Tensg of tensor modules. Its objects M are defined as integrable modules of finite Loewy length such that the algebraic dual M* is also integrable and of finite Loewy length. We prove that the simple objects of Tensg are precisely the simple tensor modules, i.e. the simple subquotients of the tensor algebra of the direct sum of the natural and conatural representations. We also study injectives in Tensg and compute the Ext1's between simple modules. Finally, we characterize a certain subcategory Tensg of Tensg as the unique minimal abelian full subcategory of the category of integrable modules which contains a non-trivial module and is closed under tensor product and algebraic dualization.