Completely integrable classical systems connected with semisimple lie algebras
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[1] A. Perelomov,et al. Explicit solutions of some completely integrable systems , 1976 .
[2] A. Perelomov,et al. Explicit solution of the Calogero model in the classical case and geodesic flows on symmetric spaces of zero curvature , 1976 .
[3] A. Perelomov,et al. Completely integrable Hamiltonian systems connected with semisimple Lie algebras , 1976 .
[4] F. Calogero. Exactly solvable one-dimensional many-body problems , 1975 .
[5] C. Marchioro,et al. Exact solution of the classical and quantal one-dimensional many-body problems with the two-body potential {ie383-01} , 1975 .
[6] J. Moser,et al. Three integrable Hamiltonian systems connected with isospectral deformations , 1975 .
[7] M. Adler. IFS Conference on Proposals for a Tax-Credit System , Institute for Fiscal Studies, London, 1973, Publication No. 5. vi + 85 pp. £1.50. , 1975, Journal of Social Policy.
[8] S. Manakov,et al. On the complete integrability of a nonlinear Schrödinger equation , 1974 .
[9] V. Arnold. Mathematical Methods of Classical Mechanics , 1974 .
[10] Francesco Calogero,et al. Solution of the One‐Dimensional N‐Body Problems with Quadratic and/or Inversely Quadratic Pair Potentials , 1971 .
[11] B. Sutherland. Exact results for a quantum many body problem in one-dimension , 1971 .
[12] C. Frønsdal,et al. Simple Groups and Strong Interaction Symmetries , 1962 .