Macdonald Polynomials and level two Demazure modules for affine sln+1
Abstract
We define a family of symmetric polynomials G,λ(z1,·s, zn+1,q) indexed by a pair of dominant integral weights. The polynomial G,0(z,q) is the specialized Macdonald polynomial and we prove that G0,λ(z,q) is the graded character of a level two Demazure module associated to the affine Lie algebra sln+1. Under suitable conditions on (,λ) (which includes the case when =0 or λ=0) we prove that G,λ(z,q) is Schur positive and give explicit formulae for them in terms of Macdonald polynomials.
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