Highest weight categories of gl(∞)-modules
Abstract
We study a category of modules over gl(∞) analogous to category O. We fix adequate Cartan, Borel and Levi-type subalgebras h, b and l with l gl(∞)n, and define OLA lgl(∞) to be the category of h-semisimple, n-nilpotent modules that satisfy a large annihilator condition as l-modules. Our main result is that these are highest weight categories in the sense of Cline, Parshall and Scott. We compute the simple multiplicities of standard objects and the standard multiplicities in injective objects, and show that a form of BGG reciprocity holds in OLA lgl(∞). We also give a decomposition of OLA lgl(∞) into irreducible blocks.
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