[[1] M. Adler and P. van Moerbeke, The algebraic complete integrability of geodesic flow on SO(4), Invent. Math., 67, (1982), 297-33110.1007/BF01393820]Search in Google Scholar
[[2] M. Adler and P. van Moerbeke, The complex geometry of the Kowalewski- Painlevé analysis, Invent. Math., 7, (1989), 3-5110.1007/BF01850654]Search in Google Scholar
[[3] M. Adler, P. van Moerbeke, and P. Vanhaecke, Algebraic integrability, Painlevé geometry and Lie algebras. A series of modern surveys in mathematics, 47, (2004)10.1007/978-3-662-05650-9]Search in Google Scholar
[[4] V.I. Arnold, Mathematical methods in classical mechanics, Springer-Verlag, Berlin- Heidelberg- New York, 1978]Search in Google Scholar
[[5] P.A. Griffiths and J. Harris, Wiley-Interscience, New York, 1978]Search in Google Scholar
[[6] L. Haine, Geodesic flow on SO(4) and Abelian surfaces, Math. Ann., 263, (1983), 435-47210.1007/BF01457053]Search in Google Scholar
[[7] M. Hénon and C. Heiles, The applicability of the third integral of motion ; some numerical experiments, Astron. J., 69, (1964), 73-7910.1086/109234]Search in Google Scholar
[[8] S. Kowalewski, Sur le problème de la rotation d’un corps solide autour d’un point fixe, Acta Math., 12, (1989), 177-23210.1007/BF02592182]Search in Google Scholar
[[9] A. Lesfari, Abelian surfaces and Kowalewski’s top, Ann. Sci. École Norm. Sup. Paris, 21, (1988), 193-22310.24033/asens.1556]Search in Google Scholar
[[10] A. Lesfari, Le système différentiel de Hénon-Heiles et les variétés Prym, Pacific J. Math., 212, (2003), 125-13210.2140/pjm.2003.212.125]Search in Google Scholar
[[11] A. Lesfari, Équations couplées non-linéaires de Schrödinger, Afr. Diaspora J. Math., 10, (2010), 96-108]Search in Google Scholar
[[12] A. Lesfari, Systèmes hamiltoniens complètement intégrables, Aequat. Math., 82, (2011), 165-20010.1007/s00010-011-0078-x]Search in Google Scholar
[[13] A. Lesfari, Etude des équations stationnaire de Schrödinger, intégrale de Gelfand- Levitan et de Korteweg-de-Vries, Solitons et méthode de la diffusion inverse, Aequat. Math., 85, (2013), 243-27210.1007/s00010-013-0201-2]Search in Google Scholar
[[14] A. Lesfari, Champ de Yang-Mills avec groupe de jauge SU(2), Mathematical Reports, 17(67), (2015), 133-153]Search in Google Scholar
[[15] A. Lesfari, Introduction à la géométrie algébrique complexe, Hermann, Paris, 2015]Search in Google Scholar
[[16] S.V. Manakov, Remarks on the integrals of the Euler equations of the n-dimensional heavy top, Func. Anal. Appl., 10, (1976), 93-94]Search in Google Scholar
[[17] P. van Moerbeke and D. Mumford, The spectrum of difference operators and algebraic curves, Acta Math., 143, (1979), 93-15410.1007/BF02392090]Search in Google Scholar
[[18] B.G. Moishezon, On n-dimensional compact varieties with n algebraically independent meromorphic functions, Amer. Math. Soc. Transl., 63, (1967), 51-17710.1090/trans2/063/02]Search in Google Scholar
[[19] D. Mumford, Tata lectures on thêta II, Progress in Math., Birkhäuser, Boston, 198210.1007/978-1-4899-2843-6]Search in Google Scholar
[[20] P. Vanhaecke, Integrable systems in the realm of algebraic geometry, Lecture Notes in Math., 1638, Springer-Verlag, 2001 10.1007/3-540-44576-5]Search in Google Scholar