___

• [1] Abenda, S. and Fedorov, Yu., On the weak Kowalewski-Painleve Property for hyperelliptically separable systems, Acta Appl. Math., 60(2000) 137-178.
• [2] Adler, M. and van Moerbeke, A., The complex geometry of the Kowalewski-Painleve analysis, Invent. Math., 97(1989) 3-51.
• [3] Baker, S., Enolskii, V.Z. and Fordy, A.P., Integrable quartic potentials and coupled KdV equations, Phys. Lett., 201A(1995) 167-174.
• [4] Belokolos, A.I., Bobenko, V.Z., Enol'skii, V.Z., Its, A.R. and Matveev. V.B., Algebro- Geometric approach to nonlinear integrable equations, Springer-Verlag 1994.
• [5] Christiansen, P. L., Eilbeck, J. C., Enolskii, V. Z. and Kostov, N. A., Quasi-periodic and periodic solutions for coupled nonlinear Schrdinger equations of Manakov type, Proc. R. Soc., A 456(2000) 2263-2281.
• [6] Conte, R., Musette, M. and Verhoeven, C., Completeness of the cubic and quartic Henon- Heiles hamiltonians, Theor. Math. Phys., 144(2005) 888-898.
• [7] Eilbeck, J.C., Enolskii, V.Z., Kuznetsov, V.B. and Leykin, D.V., Linear r-matrix algebra for systems separable in parabolic coordinates, Phys. Lett., 180A(1993) 208-214.
• [8] Grammaticos, B. Dorozzi, B., Ramani, A., Integrability of hamiltonians with third and fourth- degree polynomial potentials, J. Math. Phys., 24(1983) 2289-2295.
• [9] Griffiths, P.A. and Harris, J., Principles of algebraic geometry, Wiley-Interscience 1978.
• [10] Haine, L., Geodesic flow on SO(4) and Abelian surfaces. Math. Ann., 263(1983) 435-472.
• [11] Hietarinta, J., Classical versus quantum integrability. J. Math. Phys., 25(1984) 1833-1840.
• [12] Hietarinta, J., Direct methods for the search of the second invariant. Phys. Rep., 147(1987) 87-154.
• [13] Kasperczuk, S., Integrability of the Yang-Mills hamiltonian system, Celes. Mech. and Dyn. Astr., 58(1994), 387-391. Erratum Celes. Mech. and Dyn. Astr., 60(1994), 289.
• [14] Kostov, N.A., Quasi-periodical solutions of the integrable dynamical systems related to Hill's equation. Lett. Math. Phys., 17(1989) 95-104.
• [15] Lesfari, A., Abelian surfaces and Kowalewski's top, Ann. Scient. Ecole Norm. Sup. Paris, 21(1988), sr. 4, 193-223.
• [16] Lesfari., A., Completely integrable systems : Jacobi's heritage, J. Geom. Phys., 31(1999) 265-286.
• [17] Lesfari, A., Le systeme differentiel de Henon-Heiles et les varietes Prym, Pacific J. Math., 212(2003), N1, 125-132.
• [18] Lesfari, A., Le theoreme d'Arnold-Liouville et ses consequences, Elem. Math., 58 (2003) 6-20.
• [19] Lesfari, A., Analyse des singularites de quelques systµemes integrables, C.R. Acad. Sci. Paris, 341(2005), Ser. I, 85-88.
• [20] Lesfari, A., Abelian varieties, surfaces of general type and integrable systems, Beitrage Alge- bra Geom., 1(2007), Vol.48, 95-114.
• [21] Lesfari, A., The Yang-Mills system and cyclic covering of abelian varieties, to appear Int. J. Geom. Methods Mod. Phys., Vol. 5(2008), N8.
• [22] Moishezon., B.G., On n-dimensional compact varieties with n algebraically independent mero- morphic functions, Amer. Math. Soc. Transl., 63(1967), 51-177.
• [23] Perelomov, A.M., Integrable system of classical mechanics and Lie algebras, Birkhauser 1994.
• [24] Piovan, L., Cyclic coverings of abelian varieties and the Goryachev-Chaplygin top, Math. Ann., 294(1992), 755-764.
• [25] Ravoson, V., Ramani, A. and Grammaticos, B., Generalized separability for a hamiltonian with nonseparable quartic potential, Phys. Lett., 191A(1994), 91-95.
• [26] Tondo, G., On the integrability of stationary and restricted °ows of the KdV hierarchy, J. Phys. A : Mat. Gen., 28(1995), 5097-5115.
• [27] Vanhaecke, P., Stratifications of hyperelliptic jacobians and the Sato Grassmannian, Acta Appl. Math., 40(1995), 143-172.
• [28] Vanhaecke, P., Integrable systems and symmetric products of curves, Math. Z., 227(1998), 93-127.
• [29] Verhoeven, C., Musette, M. and Conte, R., General solution of hamiltonians withs extend cubic and quartic potentials, Theor. Math. Phys., 134(2003), 128-138.
• [30] Wojciechowski, S., Integrability of one particle in a perturbed central quartic potential, Physica Scripta, 31(1985), 433-438.