q-Opers and Bethe Ansatz for Open Spin Chains I

TL;DR

This paper explores the geometric structure of Bethe Ansatz equations for open spin chains, introducing reflection-invariant q-opers and connecting them to spectra of such chains within the q-Langlands duality framework.

Contribution

It initiates the geometric study of open boundary conditions in Bethe Ansatz equations by defining reflection-invariant q-opers and relating them to the spectra of open spin chains.

Findings

Defined the space of reflection-invariant q-opers for open spin chains.

Connected the space of such q-opers to solutions of Bethe Ansatz equations.

Compared new geometric insights with existing integrable systems results.

Abstract

In in a nutshell, the classical geometric $q$-Langlands duality can be viewed as a correspondence between the space of $(G,q)$-opers and the space of solutions of $^L\mathfrak{g}$ XXZ Bethe Ansatz equations. The latter describe spectra of closed spin chains with twisted periodic boundary conditions and, upon the duality, the twist elements are identified with the $q$-oper connections on a projective line in a certain gauge. In this work, we initiate the geometric study of Bethe Ansatz equations for spin chains with open boundary conditions. We introduce the space of $q$-opers whose defining sections are invariant under reflection through the unit circle in a selected gauge. The space of such reflection-invariant $q$-opers in the presence of certain nondegeneracy conditions is thereby described by the corresponding Bethe Ansatz problem. We compare our findings with the existing results in integrable systems and representation theory. This paper discusses the type-A construction leaving the general case for the upcoming work.