Tensor product structure of affine Demazure modules and limit constructions
Abstract
Let be a simple complex Lie algebra, we denote by the corresponding affine Kac--Moody algebra. Let 0 be the additional fundamental weight of . For a dominant integral --coweight , the Demazure submodule V-(m0) is a --module. For any partition of =Σj j as a sum of dominant integral --coweights, the Demazure module is (as --module) isomorphic to j V-j(m0). For the ``smallest'' case, = a fundamental coweight, we provide for of classical type a decomposition of V-(m0) into irreducible --modules, so this can be viewed as a natural generalization of the decomposition formulas in KMOTU and Magyar. A comparison with the Uq()--characters of certain finite dimensional Uq'()--modules (Kirillov--Reshetikhin--modules) suggests furthermore that all quantized Demazure modules V-,q(m0) can be naturally endowed with the structure of a Uq'()--module. Such a structure suggests also a combinatorially interesting connection between the LS--path model for the Demazure module and the LS--path model for certain Uq'()--modules in NaitoSagaki. For an integral dominant --weight let V() be the corresponding irreducible --representation. Using the tensor product decomposition for Demazure modules, we give a description of the --module structure of V() as a semi-infinite tensor product of finite dimensional --modules. The case of twisted affine Kac-Moody algebras can be treated in the same way, some details are worked out in the last section.
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