English

On $b$-Whittaker functions

Mathematical Physics 2018-11-20 v2 math.MP Quantum Algebra Representation Theory

Abstract

The bb-Whittaker functions are eigenfunctions of the modular qq-deformed gln\mathfrak{gl}_n open Toda system introduced by Kharchev, Lebedev, and Semenov-Tian-Shansky. Using the quantum inverse scattering method, the named authors obtained a Mellin-Barnes integral representation for these eigenfunctions. In the present paper, we develop the analytic theory of the bb-Whittaker functions from the perspective of quantum cluster algebras. We obtain a formula for the modular open Toda system's Baxter operator as a sequence of quantum cluster transformations, and thereby derive a new modular bb-analog of Givental's integral formula for the undeformed Whittaker function. We also show that the bb-Whittaker functions are eigenvectors of the Dehn twist operator from quantum higher Teichm\"uller theory, and obtain bb-analogs of various integral identities satisfied by the undeformed Whittaker functions, including the continuous Cauchy-Littlewood identity of Stade and Corwin-O'Connell-Sepp\"al\"ainen-Zygouras. Using these results, we prove the unitarity of the bb-Whittaker transform, thereby completing the analytic part of the proof of the conjecture of Frenkel and Ip on tensor products of positive representations of Uq(sln)U_q(\mathfrak{sl}_n), as well as the main step in the modular functor conjecture of Fock and Goncharov. We conclude by explaining how the theory of bb-Whittaker functions can be used to derive certain hyperbolic hypergeometric integral evaluations found by Rains.

Cite

@article{arxiv.1806.00747,
  title  = {On $b$-Whittaker functions},
  author = {Gus Schrader and Alexander Shapiro},
  journal= {arXiv preprint arXiv:1806.00747},
  year   = {2018}
}

Comments

36 pages, minor changes, references added

R2 v1 2026-06-23T02:17:13.541Z