Cyclotomic Gaudin models with irregular singularities

Vicedo, Benoit and Young, Charles (2017) Cyclotomic Gaudin models with irregular singularities. pp. 247-278. ISSN 0393-0440

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Generalizing the construction of the cyclotomic Gaudin algebra from arXiv:1409.6937, we define the universal cyclotomic Gaudin algebra. It is a cyclotomic generalization of the Gaudin models with irregular singularities defined in arXiv:math/0612798. We go on to solve, by Bethe ansatz, the special case in which the Lax matrix has simple poles at the origin and arbitrarily many finite points, and a double pole at infinity.

Item Type	Article
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Date Deposited	18 Nov 2024 11:52
Last Modified	18 Nov 2024 11:52

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