Positive representations of split real quantum groups and future perspectives

TL;DR

This paper constructs positive, self-adjoint principal series representations for the modular double of split real quantum groups of type A, using cluster variables and Mellin transform, with implications for future representation theory.

Contribution

It introduces a new class of positive representations for the modular double of type A quantum groups, extending previous results and proposing their tensor product closure.

Findings

Constructed positive principal series representations for $U_{q ilde{q}}(g_R)$

Derived explicit formulas using cluster variables and Mellin transform

Discussed potential closure under tensor products and future generalizations

Abstract

We construct a special principal series representation for the modular double $U_{q\tilde{q}}(g_R)$ of type $A_r$ representing the generators by positive essentially self-adjoint operators satisfying the transcendental relations that also relate $q$ and $\tilde{q}$. We use the cluster variables parametrization of the positive unipotent matrices to derive the formulas in the classical case. Then we quantize them after applying the Mellin transform. Our construction is inspired by the previous results for $g_R=sl(2,R)$ and is expected to have a generalization to other simply-laced types. We conjecture that our positive representations are closed under the tensor product and we discuss the future perspectives of the new representation theory following the parallel with the established developments of the finite-dimensional representation theory of quantum groups.