Gaudin model and Deligne's category

Abstract

We show that the construction of the higher Gaudin Hamiltonians associated to the Lie algebra gln admits an interpolation to any complex n. We do this using the Deligne's category Dt, which is a formal way to define the category of finite-dimensional representations of the group GLn, when n is not necessarily a natural number. We also obtain interpolations to any complex n of the no-monodromy conditions on a space of differential operators of order n, which are considered to be a modern form of the Bethe ansatz equations. We prove that the relations in the algebra of higher Gaudin Hamiltonians for complex n are generated by our interpolations of the no-monodromy conditions. Our constructions allow us to define what it means for a pseudo-deifferential operator to have no monodromy. Motivated by the Bethe ansatz conjecture for the Gaudin model associated with the Lie superalgebra gln n', we show that a ratio of monodromy-free differential operators is a pseudo-differential operator without monodromy.