Categorification of DAHA and Macdonald polynomials

Abstract

We describe a categorification of the Double Affine Hecke Algebra (H -.4emH) associated with an affine Lie algebra g, including a categorification of the polynomial representation and Macdonald polynomials. Our categorification results are presented in the derived setting, focusing on the derived category of graded modules over the Lie superalgebra I[], where I ⊂ g is the Iwahori subalgebra of the affine Lie algebra and is a formal odd variable. First, we show that the compositions of induction and restriction functors associated with minimal parabolic subalgebras pi categorify the Demazure operators Ti + 1 ∈ H -.4emH, ensuring that all algebraic relations of Ti have categorical interpretations. Second, for each dominant weight λ we introduce a complex EMλ of I[]-modules and a complex PMλ of g[z,]-modules, whose Euler characteristics are equal to nonsymmetric Eλ and symmetric Pλ Macdonald polynomials respectively. We illustrate our theory with the example g=sl2 where we construct the cyclic representations of Lie superalgebra I[] such that their supercharacters coincide with certain normalizations of nonsymmetric Macdonald polynomials.