A Twining Character Formula For Demazure Modules

Using Littelmann's path model for highest weight representations of Kac᎐Moody algebras, we obtain explicit combinatorial expressions for certain specialized characters of all Demazure modules of A Ž1. and A Ž2. .

The Fock space of m + p bosonic and n + q fermionic quantum oscillators forms a unitarizable module of the general linear superalgebra gl m+p| n+q . Its tensor powers decompose into direct sums of infinite-dimensional irreducible highest-weight gl m+p| n+q -modules. We obtain an explicit decompositi

## Abstract Let __k__ be an algebraically closed field of prime characteristic __p__ > 2, and let __S__(__n__) be the special Lie superalgebra over __k__. The iso‐classes of simple restricted modules of these algebras are classified, and the character formulas of restricted simple modules are given

In [1], Borcherds defined generalized Kac-Moody (denoted by GKM for short) algebras and gave a character formula for lowest weight modules of these algebras. In this paper we give a character formula for lowest weight modules of GKM superalgebras. For any standard result about contragredient superal