Groupes de Lie-Poisson quasitriangulaires

1. Aminou (R.), Groupes de Lie-Poisson et bigèbres de Lie, Thèse, Université des Sciences et Techniques de Lille Flandres Artois, Juin 1988.

   Google Scholar 

2. Aminou (R.). et Kosmann-Schwarzbach (Y.), Bigébres de Lie, doubles et carrés, Ann. Inst. Henri Poincaré 1988, 49, No. 4, 461–478.

   MathSciNet  MATH  Google Scholar 

3. Dazord (P.) et Sondaz (D.), Variétés de Poisson-Algébroïdes de Lie, Séminaire Sud-Rhodanien, lère partie, Publ. Département Math., Université Claude Bernard-Lyon I, 1988, 1/B.

   Google Scholar 

4. Drinfel’d (V. G.), Hamiltonian structures on Lie groups, Lie bialgebras and the geometric meaning of the classical Yang-Baxter equations, Soviet Math. Dokl. 1983, 27, No. 1, 68–71.

   MathSciNet  MATH  Google Scholar 

5. Drinfel’d (V. G.), Quantum Groups, Proceedings Int. Congress Math. (Berkeley, 1986), Amer. Math. Soc. 1988.

   Google Scholar 

6. Gel’fand (I. M.) et Dorfman (I. Ya.), Hamiltonian operators and the classical Yang-Baxter equation, Funct. Anal. Appl. 1982, 16, No. 4, 241–248.

   Article  MathSciNet  MATH  Google Scholar 

7. Kosmann-Schwarzbach (Y.), Poisson-Drinfeld groups, in Topics in Soliton theory and exactly solvable non linear equations, Ablowitz (M.), Fuchssteiner (B.) et Kruskal (M.), éds., World Scientific, Singapour 1987.

   Google Scholar 

8. Kosmann-Schwarzbach (Y.) et Magri (F.), Poisson-Lie groups and complete integrability, I. Drinfeld bigebras, dual extensions and their canonical representations, Ann. Inst. Henri Poincaré 1988, 49, No. 4, 433–460.

   MathSciNet  MATH  Google Scholar 

9. Lu (Jiang-Hua) et Weinstein (A.), Poisson-Lie groups, dressing transformations and Bruhat decompositions, J. Diff. Geometry, to appear.

   Google Scholar 

10. Mackey (G. W.), Products of subgroups and projective multipliers, Colloquia Mathematica Societatis Janos Bolyai, 5, Hilbert Space operators, Tihany (Hongrie) 1970.

    Google Scholar 

11. Magri (F.), Pseudocociclo di Poisson e structtura PN gruppale, applicazione al reticolo di Toda, manuscrit inédit, Milan 1983.

    Google Scholar 

12. Magri (F.) et Kosmann-Schwarzbach (Y.), Poisson-Lie groups and complete integrability, II. Quadratic Poisson structures, en préparation.

    Google Scholar 

13. Magri (F.) et Morosi (C.), A geometrical characterization of integrable Hamiltonian systems through the theory of Poisson-Nijenhuis manifolds, Quaderno S 19 / 1984, Université de Milan.

    Google Scholar 

14. Majid (Sh. H.), Non-commutative-geometric groups by a bicrossproduct construction: Hopf algebras at the Planck scale, Thèse, Harvard University, Août 1988. A paraître dans J. Algebra, Pacific J. Math. et J. Classical and Quantum Gravity.

    Google Scholar 

15. Medina (A.), Structures de Lie-Poisson pseudo-riemanniennes et structures orthogonales, Comptes rendus Acad. Sc. Paris 1985, 301, série I, No. 10, 507–510.

    MathSciNet  MATH  Google Scholar 

16. Semenov-Tian-Shansky (M. A.), What is a classical r-matrix?, Funct. Anal. Appl. 1983, 17, No. 4, 259–272.

    Article  MATH  Google Scholar 

17. Semenov-Tian-Shansky (M. A.), Dressing transformations and Poisson group actions, Publ. RIMS (Kyoto University) 1985, 21, 1237–1260.

    Article  MathSciNet  MATH  Google Scholar 

18. Semenov-Tian-Shansky (M. A.), Classical r-matrices, Lax equations, Poisson-Lie groups and dressing transformation, in Field Theory, quantum gravity and strings, II, de Vega (H. J.) et Sanchez (N.), éds., Lecture Notes in Physics 280, Springer-Verlag, Berlin 1987, 174–214.

    Chapter  Google Scholar 

19. Sklyanin (E. K.), Quantum version of the method of inverse scattering problem, J. Soviet Math. 1982, 19, No. 5, 1546–1596.

    Article  MathSciNet  MATH  Google Scholar 

20. Takeuchi (M.), Matched pairs of Lie groups and bismash products of Hopf algebras, Comm. Alg. 1981, 9, No. 8, 841–882.

    Article  MATH  Google Scholar 

21. Verdier (J. L.), Groupes quantiques, Séminaire Bourbaki (Juin 1987), Astérisque 152–153, Soc. Math. France 1987.

    Google Scholar 

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