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Quantum-classical duality for Gaudin magnets with boundary

Published 26 Nov 2019 in math-ph, cond-mat.str-el, hep-th, math.MP, and nlin.SI | (1911.11792v3)

Abstract: We establish a remarkable relationship between the quantum Gaudin models with boundary and the classical many-body integrable systems of Calogero-Moser type associated with the root systems of classical Lie algebras (B, C and D). We show that under identification of spectra of the Gaudin Hamiltonians $H_j{\rm G}$ with particles velocities $\dot q_j$ of the classical model all integrals of motion of the latter take zero values. This is the generalization of the quantum-classical duality observed earlier for Gaudin models with periodic boundary conditions and Calogero-Moser models associated with the root system of the type A.

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