|
|
| Date: | Thu, October 12, 2017 |
| Time: | 11:15 |
| Place: | Seminar Room (120), Research I |
Abstract: Let \(\mathfrak{g}\) be a root-reductive Lie algebra over an algebraically closed field \(\mathbb{K}\) of characteristic \(0\) with a splitting Borel subalgebra \(\mathfrak{b}\) containing a splitting maximal toral subalgebra \(\mathfrak{h}\). We study the category \(\bar{\mathcal{O}}\) consisting of all \(\mathfrak{h}\)-weight \(\mathfrak{g}\)-modules which are locally \(\mathfrak{b}\)-finite and have finite-dimensional \(\mathfrak{h}\)-weight spaces. The focus is on very special Borel subalgebras called the Dynkin Borel subalgebras. This talk serves as an initial passage to the understanding of categories \(\mathcal{O}\) for infinite-dimensional root-reductive Lie algebras.