Orthogonality of spin q-Whittaker polynomials

Abstract

The inhomogeneous spin q-Whittaker polynomials are a family of symmetric polynomials which generalize the Macdonald polynomials at t=0. In this paper we prove that they are orthogonal with respect to a variant of the Sklyanin measure on the n dimensional torus and as a result they form a basis of the space of symmetric polynomials in n variables. Instrumental to the proof are inhomogeneous eigenrelations, which partially generalize those of Macdonald polynomials. We also consider several special cases of the inhomogeneous spin q-Whittaker polynomials, which include variants of symmetric Grothendieck polynomials or spin Whittaker functions.

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