Gaudin model and Deligne’s category

• dc.contributor.author: Feigin, B.
• dc.contributor.author: Rybnikov, L.
• dc.contributor.author: Uvarov, F.
• dc.date.issued: 2023-12-19
• dc.identifier.uri: https://hdl.handle.net/1721.1/153217
• dc.description.abstract: We show that the construction of the higher Gaudin Hamiltonians associated with the Lie algebra $$\mathfrak {gl}_{n}$$ gl n admits an interpolation to any complex number n. We do this using the Deligne’s category $$\mathcal {D}_{t}$$ D t , which is a formal way to define the category of finite-dimensional representations of the group $$GL_{n}$$ G L n , when n is not necessarily a natural number. We also obtain interpolations to any complex number 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-differential operator to have no monodromy. Motivated by the Bethe ansatz conjecture for the Gaudin model associated with the Lie superalgebra $$\mathfrak {gl}_{n\vert n'}$$ gl n | n ′ , we show that a ratio of monodromy-free differential operators is a pseudo-differential operator without monodromy.
• dc.publisher: Springer Netherlands
• dc.relation.isversionof: https://doi.org/10.1007/s11005-023-01747-y
• dc.source: Springer Netherlands
• dc.type: Article
• dc.identifier.citation: Letters in Mathematical Physics. 2023 Dec 19;114(1):3
• dc.contributor.department: Massachusetts Institute of Technology. Department of Mathematics
• dc.eprint.version: Author's final manuscript
• dc.language.rfc3066: en