Bethe subalgebras in Yangians and Kirillov-Reshetikhin crystals
Abstract
Let g be a complex simple finite dimensional Lie algebra and G be the adjoint Lie group with the Lie algebra g. To every C ∈ G one can associate a commutative subalgebra B(C) in the Yangian Y(g), which is responsible for the integrals of the (generalized) XXX Heisenberg magnet chain. Using the approach of arXiv:1708.05105, we construct a natural structure of affine crystals on spectra of B(C) in Kirillov-Reshetikhin Y(g)-modules in type A. We conjecture that such a construction exists for arbitrary g and gives Kirillov-Reshetikhin crystals. Our main technical tool is the degeneration of Bethe subalgebras in the Yangian to commutative subalgebras Au in the universal enveloping of the current Lie algebra, U(g[t]), which depend on the parameter from the Lie algebra g (and are of independent interest). We show that these subalgebras come from the Feigin-Frenkel center on the critical level as described by Feigin, Frenkel and Toledano Laredo in arXiv:math/0612798. This allows to prove that our affine crystals in type A are indeed Kirillov-Reshetikhin by reducing to the crystal structure on the spectra of inhomogeneous Gaudin model which is already known (arXiv:1708.05105).
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