Yang-Baxter Equations for General Metaplectic Ice

Abstract

In this paper, we extend results connecting quantum groups to spherical Whittaker functions on metaplectic covers of GLr(F), for F a nonarchimedean local field. Brubaker, Buciumas, and Bump showed that for a certain metaplectic n-fold cover of GLr(F) a set of Yang-Baxter equations model the action of standard intertwiners on principal series Whittaker functions. These equations arise from a Drinfeld twist of the quantum affine Lie superalgebra Uv(gl(n)), where v = q-1 for q the cardinality of the residue field. We extend their results to all metaplectic covers of GLr(F), providing new solutions to Yang-Baxter equations matching the scattering matrix for the associated Whittaker functions. Each cover has an associated integer invariant nQ and the resulting solutions are connected to the quantum group Uv(gl(nQ)) and quantum superalgebra Uv(gl(1|nQ)).