The Branching Rules for Affine Lie Algebras

Presented here is a construction of certain bases of basic representations for classical affine Lie algebras. The starting point is a ‫-ޚ‬grading ᒄ s ᒄ q ᒄ q ᒄ y1 0 1 of a classical Lie algebra ᒄ and the corresponding decomposition ᒄ s ᒄ q ᒄ q ˜˜ỹ 1 0 ᒄ of the affine Lie algebra ᒄ. By using a genera

## Abstract In this paper we study the branching problems for the Hecke algebra ℋ︁(__D__ ~__n__~ ) of type __D__ ~__n__~ . We explicitly describe the decompositions into irreducible modules of the socle of the restriction of each irreducible ℋ︁(__D__ ~__n__~ )‐representation to ℋ︁(__D__ ~__n__ –1~)

We study, in the path realization, crystals for Demazure modules of affine Lie algebras of types A Ž1. , B Ž1. , C Ž1. , D Ž1. , A Ž2. , A Ž2. , and D Ž2. . We find a special sequence of affine Weyl group elements for the selected perfect crystal, and show that if the highest weight is l⌳ , the Dem

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. .

We generalize I. Frenkel's orbital theory for non twisted affine Lie algebras to the case of twisted affine Lie algebras using a character formula for certain nonconnected compact Lie groups.