Eigenvalues of Bethe vectors in the Gaudin model

Eigenvalues of Bethe vectors in the Gaudin model

According to the Feigin–Frenkel–Reshetikhin theorem, the eigenvalues of higher Gaudin Hamiltonians on Bethe vectors can be found using the center of an affine vertex algebra at the critical level. We recently calculated explicit Harish-Chandra images of the generators of the center in all classical...

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Bibliographic Details
Published in:Theoretical and mathematical physics Vol. 192; no. 3; pp. 1258 - 1281
Main Authors: Molev, A. I., Mukhin, E. E.
Format: Journal Article
Language:English
Published: Moscow Pleiades Publishing 01-09-2017
Springer Nature B.V
Subjects:
Algebra
Applications of Mathematics
Eigenvalues
Mathematical analysis
Mathematical and Computational Physics
Operators (mathematics)
Physics
Physics and Astronomy
Theoretical
Tungsten
Vectors (mathematics)
classical
character
algebra
Gaudin Hamiltonian
Bethe vector
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Summary:According to the Feigin–Frenkel–Reshetikhin theorem, the eigenvalues of higher Gaudin Hamiltonians on Bethe vectors can be found using the center of an affine vertex algebra at the critical level. We recently calculated explicit Harish-Chandra images of the generators of the center in all classical types. Combining these results leads to explicit formulas for the eigenvalues of higher Gaudin Hamiltonians on Bethe vectors. The Harish-Chandra images can be interpreted as elements of classical W-algebras. By calculating classical limits of the corresponding screening operators, we elucidate a direct connection between the rings of q-characters and classical W-algebras.
ISSN:0040-5779
1573-9333
DOI:10.1134/S0040577917090021