Stable Limit DAHA of type (C,C) and Stable Limit Koornwinder Polynomials
Abstract
We construct two stable limit representations of the double affine Hecke algebra of type (C,C) on the space of almost symmetric Laurent polynomials, namely the positive and negative stable limit representations. Starting from the standard polynomial representation of the finite rank DAHA of type (Cn,Cn), we study the asymptotic behavior of the Cherednik operators under the two natural rescalings by positive and negative powers of the parameter t. We prove that these rescaled Cherednik operators admit well-defined limits on the ring of almost symmetric Laurent polynomials. This yields stable positive and negative actions of a common stable limit DAHA. The action of the limit Cherednik operators is also proven to be triangular on a natural basis of almost symmetric Laurent polynomials labeled by tuple-partition symbols with respect to the induced Bruhat order. We further construct for each of the two stable limit representations a set of simultaneous eigenfunctions of the limit Cherednik operators using the partial symmetrization operators acting on the non-symmetric Koornwinder polynomials. We show that each of the two sets of the eigenfunctions form a basis of the space of almost symmetric Laurent polynomials, and denote them by the positive and negative stable limit Koornwinder polynomials.
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