Dualities of Gaudin models with irregular singularities for general linear Lie (super)algebras

Abstract

We prove an equivalence between the actions of the Gaudin algebras with irregular singularities for gld and glp+m|q+n on the Fock space of d(p+m) bosonic and d(q+n) fermionic oscillators. This establishes a duality of (gld, glp+m|q+n) for Gaudin models. As an application, we show that the Gaudin algebra with irregular singularities for glp+m|q+n acts cyclically on each weight space of a certain class of infinite-dimensional modules over a direct sum of Takiff superalgebras over glp+m|q+n and that the action is diagonalizable with a simple spectrum under a generic condition. We also study the classical versions of Gaudin algebras with irregular singularities and demonstrate a duality of (gld, glp+m|q+n) for classical Gaudin models.