Demazure Filtrations of Tensor Product Modules and Character Formula

Abstract

We study the structure of the finite-dimensional representations of sl2[t], the current Lie algebra type of A1, which are obtained by taking tensor products of special Demazure modules. We show that these representations admit a Demazure flag and obtain a closed formula for the graded multiplicities of the level 2 Demazure modules in the filtration of the tensor product of two local Weyl modules for sl2[t]. Furthermore, we derive an explicit expression for graded character of the tensor product of a local Weyl module with an irreducible sl2[t] module. In conjunction with the results of MR3210603, our findings provide evidence for the conjecture in 9 that the tensor product of Demazure modules of levels m and n respectively has a filtration by Demazure modules of level m + n.