New integrable generalizations of Calogero-Moser quantum problem

Chalykh, O.A., Feigin, M. and Veselov, A.P. (1998) New integrable generalizations of Calogero-Moser quantum problem. Journal of Mathematical Physics, 39(2), pp. 695-703. (doi: 10.1063/1.532347)

Full text not currently available from Enlighten.


A one-parameter deformation of Calogero–Moser quantum problem is introduced. It is shown that corresponding Schrödinger operator is integrable for any value of the parameter and algebraically integrable in case of integer value.

Item Type:Articles
Glasgow Author(s) Enlighten ID:Feigin, Professor Misha
Authors: Chalykh, O.A., Feigin, M., and Veselov, A.P.
College/School:College of Science and Engineering > School of Mathematics and Statistics > Mathematics
Journal Name:Journal of Mathematical Physics
Publisher:American Institute of Physics
ISSN (Online):1089-7658

University Staff: Request a correction | Enlighten Editors: Update this record