Publications
[90.1] Cortet J.C. : Star representations of E(2).
Lett. Math. Phys.,141-149.
[90.2] Flato M. et Fronsdal C. : Three-dimensional singletons.
Lett.Math.Phys. 20, 65-74.
[90.3] Flato M. : Physique et Vérité, dans
le volume en l'honneur de M. Schutzenberger.
[90.4] Flato M. : Le pouvoir des Mathématiques.
Hachette.
[90.5] Martin C. et Piard A. : On a class of representations
of the Virasoro
algebra and a conjecture of Kac. Lett. Math. Physics 20, 343-354.
[90.6] Pinczon G. : The enveloping algebra of the Lie superalgebra
osp(1,2). J. of Algebra, 132, 1, 219-242.
[90.7] Semenov-Tian-Shansky M. et Reshetikhin N. : Central
extensions of quantum = current algebras. Lett. Math. Phys., 19, 133-139.
[91.1] Flato M. et Fronsdal C. : Non abelian singletons.
J. Math. Phys. 32, 524-531.
[91.2] Flato M. et Lu Z.C. : Remarks on quantum
groups. Lett. Math. Phys. 21, 85-88.
[91.3] Flato M. et Sternheimer D. : On a possible origin
of quantum groups. Lett. Math. Phys. 22, 155-160.
[91.4] Magnin L. : Verification of the Riemann hypothesis
for 7-dimensional nilpotent Lie algebras. J. Mathematical Sciences Calcutta.
Vol.2, 2.
[91.5] Martin C. et Piard A. : Indecomposable Modules over the
Virasoro Lie algebra and a conjecture of V. Kac. Commun. Math.
Phys. 137, 109-132.
[91.6] Martin C. : A class of irreducible modules over the Virasoro
algebra and a conjecture of Victor Kac. Proceedings of ``Topological and
geometrical methods in field theory'' (Turku, Finland; May 26-June 1, 1991).
Jouko Mickelsson and Osmo Pekonen, Eds., World Scientific (1992).
[91.7] Martin C. et Piard A. : Non-bounded indecomposable admissible
modules over the Virasoro algebra. Lett. Math. Phys. 23, 319-324.
[91.8] Pinczon G. et Ben Amor H. : Extensions of representations
of Lie superalgebras. J. Math. Phys. 32, 3.
[91.9] Benayadi S. : Certaines propriétés d'une
classe d'algèbres de Lie qui généralisent les algèbres
de Lie semi-simples. Ann. Fac. Sci. Toulouse, XII, 1, 29-35.
[92.1] Bonneau P., Flato M. et Pinczon G.
: A natural and rigid model of quantum groups. Lett. Math.
Phys. 25, 75-84.
[92.2] Bonneau P. : Cohomology and associated deformations for
non necessarily coassociative bialgebras. Lett. Math. Phys. 26, 277-283.
[92.3] Flato M., Harun Ar Rashid A.M. et Fronsdal C. : Three
D. Singleton and 2-D C.F.T. Int. J. Mod. Phys. A, 7, 2193-2206.
[92.4] Flato M., Connes A. et Sternheimer D. : Closed
star-products and cyclic cohomology. Lett. Math. Phys. 24, 1-12.
[92.5] Magnin L. : Remarks on weight systems and cohomology of
nilpotent Lie algebras. Algebras, Groups and Geometry, 9, 109-133.
[92.6] Martin C. et Piard A. : Classification of the indecomposable
admissible modules over the Virasoro Lie algebra with weightspaces of dimension
not exceeding two. Commun. Math. Phys. 150, 465-493.
[92.7] Molin P. : Applications of the star-products method to
the angular momentum quantization. Lett. Math. Phys. 25, 213-225.
[92.8] Arnal D., Ben Amor H., Benayadi S. et Pinczon G. : Une
algèbre de Lie non semi-simple vérifiant
$H^1(g)=3D H^2(g) =3D H^0(g, g) =3D H^1(g, g) =3D H^2(g, g) =3D \0\$.
C.R. Acad. Sci. Paris 315, I.
[92.9] Dito J. : Star products and non standard quantization
for Klein-Gordon equation. J. Math. Phys. 33 (1992) 791-801.
[92.10] Angelopoulos E.: Propriétés universelles
relatives à la réduction du produit tensoriel de g-modules.
C.R. Acad. Sci. Paris 314, I.
[92.11] Semenov-Tian-Shansky M., Alekseev A. et Faddeev L. :
Hidden quantum group inside Kac--Moody algebras. Commun. Math. Phys., 149,
335-345.
[93.1] Flato M., Lu Z.C. et Sternheimer D. : From where do
quantum groups come? Foundations of Physics 23, 587-598.
[93.2] Flato M., Hadjiivanov L.K. et Todorov L.T. : Quantum
deformations of Singletons and free zero-mass Fields. Foundations of Physics
23, 571-586.
[93.3] Flato M. et Sternheimer D. : Quantum groups, star-products
and cyclic cohomology. In : "Quantum and non-commutative analysis", Math.
Phys. Studies, vol. 16 pp. 221-337 (H. Araki, K. Ito, A. Kishimoto
and I. Ojima, eds), Kluwer Acad. Publ..
[93.4] Magnin L. : Cohomologie adjointe des Algèbres de
Lie de Heisenberg. Comm. in Algebra 21, 2101-2129.
[93.5] Lesimple M. et Pinczon G. : Deformations of Lie group
and Lie algebra representations. J. Math. Phys. 34, 4251-4272.
[93.6] Semenov M. et Reyman A. : Dynamical Systems VII, Ch2.
Group-Theoretical methods in the theory of finite-dimensional integrable
systems, Ch3. Quantization of open Toda lattices. Springer Verlag. Encyclopedia
of Mathematical Sciences, Vol.16.
[93.7] Angelopoulos E. et Benayadi S. : Construction d'algèbres
de Lie sympathiques non semi-simples munies de produits scalaires invariants.
C.R. Acad. Sci. Paris, t.317, série I, 741-744.
[93.8] Simon J. et Taflin E. : The Cauchy problem for nonlinear
Klein Gordon equations. Commun. Math. Phys. 152, 433-478.
[94.1] Bonneau P. : Topological quantum double. Rev. Math.
Phys. 16, 305-318.
[94.2] Bonneau P., Flato M., Gerstenhaber M. et Pinczon G. :
The hidden group structure of quantum groups : strong duality, rigidity
and preferred déformations. Commun. Math. Phys. 161,
125-156.
[94.3] Flato M. et Sternheimer D. : Star-products, quantum groups,
cyclic cohomology and pseudo-differential calculus, Amer. Math. Soc. Contemporary
Mathematics (P. Sally et al. eds.), 175, 53-72.
[94.4] Arnal D., Ben Amor H. et Pinczon G. : The structure of
sl(2,1) supersymmetry, Pacific J. Math., 165, 17-19.
[94.5] Flato M., Simon J. et Taflin E. : The Maxwell-Dirac equations:
asymptotic completeness and the infrared problem. Reviews in Math. Phys.
(numéro spécial) et "The State of Matter", Adv. Series in
Math. 80 (M. Aizenman et H. Araki eds.) en l'honneur d'Elliott Lieb,
265-278, World Scientific.
[94.6] Semenov-Tian-Shansky M. : Quantum integrable systems.
Séminaire Bourbaki, exposé 788, juin 1994, Astérisque
No 227, 365-387.
[94.7] Flato M. et Sternheimer D. : Closedness of
star products and cohomologies, pp. 241-259 dans: Lie Theory and Geometry:
In Honor of B. Kostant, J.L. Brylinski et al., eds., Progress in Mathematics,
Birkhäuser, Boston.
[94.8] Semenov-Tian-Shansky M.: Poisson Lie Groups, Quantum Duality
Principle and the Quantum Double, in Mathematical aspects of conformal
and topological field theories and quantum groups (South Hadley, MA, 1992),
219-248, Contemporary Mathematics, 175 (P. Sally et al. eds.),
Amer. Math. Soc., Providence
[94.9] Matveev V.B. : Deformations of algebraic curves and integrable
nonlinear evolution equations. Acta Applicanda Math., 36, (1-2), 187-210.
[94.10] Beutler R., Matveev V.B. et Stahlhofen A.A. : What do
solitons, breathers and positons have in common? Physica Scripta
50, 9-12.
[94.11] Matveev V.B. : Asymptotics of the multipositon
soliton, $\tau$-function of the Korteweg-de Vries equation and the supertransparency,
J. Math. Phys. 35, 2955-2970.
[94.12] Babenko A., Belokolos E., Enolskij V., Its A. et Matveev
V.B. : ``Algebro-Geometric Approach to Nonlinear Integrable Equations",
Series in Nonlinear Dynamics, Springer-Verlag, Berlin.
[94.13] Matveev V.B. : Positons: a new concept in the theory
of nonlinear waves, pp. 259-262 dans ``Nonlinear Coherent Structures in
Physics and Biology", Mertens F. et Spatshek K. eds., Plenum Pub. Co.
[94.14] Beutler R. et Matveev V.B. : Do nonsingular globally
bounded positon solutions exist? Zap. Nauchn. Sem. POMI, 215 (dedicated
to L.D. Faddeev), 38-49.
[94.15] Angelopoulos E. : Taylor formula, tensor products, and
unitarizability. Non-compact Lie groups and some of their applications
(San Antonio, TX, 1993, Edited by G. Camar et Raj Wilson), 251-263, NATO
Adv. Sci. Inst. Ser. C, Math. Phys. Sci., 429, Kluwer Acad. Publ.
[95.1] Bidegain F. et Pinczon G. : A star product approach to noncompact
quantum groups, Letters in Mathematical Physics 33, 231-240.
[95.2] Martin C. : The Bohm-Aharonov effect : A seven dimensional
structural group. Paru dans Lett. Math. Phys., 37, pp. 67-74.
[95.3] Flato M. et Sternheimer D. : Topological Quantum Groups,
star-products and their relations, St Petersburg Mathematical Journal (Algebra
and Analysis), 6(3), 242-251.
[95.4] Flato M., Gerstenhaber M. et Voronov A. : Cohomology and
deformation of Leibniz pairs, Lett. Math. Phys., 34, 77-90.
[95.5] Arnal D., Cortet J.C., et Ludwig J., : Moyal product and
representations of solvable groups, J. Funct. Anal, 133, n°2,
402-424.
[95.6] Simon J. et Taflin E., : Initial data for non linear evolution
equations and differentiable vectors of group representations. In : Modern
group theoretical methods in physics : Proceedings of the conference in
honour of Guy Rideau ; Math. Phys. Studies, 18, Kluwer, 243-253.
[95.7] Matveev V. B. : Deformation of algebraic curves and integrable
non linear evolution equations, Acta Applicanda Math., 36, 1-24.
[95.8] Matveev V. B. et Stahlhofen A. A. : Positons for the Toda
lattice and related spectral problems, J. of Phys. A., 28, 1957-1965.
[95.8] Bonneau P. : Star products and Quantum Groups, Proceedings
of the 1995 Bialoweza Workshop, Polish Scient. Publishers.
[96.1] Semenov-Tian-Shansky M.: Twisted double, graphs, and configurations
of rational curves ; International Conference on Sympletic Geometry, CIRM,
Luminy.
[96.2] Semenov-Tian-Shansky M.: Ten lectures on integrable systems,
Ecole d'Eté de CIMPA.
[96.3] Gautheron P.: Some remarks concerning Nambu Mechanics,
Lett. Math. Phys., 37, pp. 103-116.
[96.4] Bidegain F. et Pinczon G. : Quantization of Poisson-Lie
Groups and Applications, Commun. Math. Phys., 179, 295-322.
[96.5] Martin C. et Zouagui M. : A non-commutative Hopf structure
on $\cal C^\infty[SL(2,\hbox C)]$ as a quantum Lorentz group, J. Math.
Phys., 37 (7), 3611-3629.
[96.6] Matveev V. B. : Geometry and Mathematical Physics,
Part I Proceedings of the Lobachevskij semester at the Euler International
Mathematical Institute, ed. by Matveev V.B., 1-256, Zapiski Seminarov POMI
V.
234, ISSN 0373-2703.
[96.7] Matveev V. B. : Ibid, Part II, 1-308, Zapiski Seminarov,
V.235.
[96.8] Matveev V. B. : Darboux transformations and integrable
systems I, MPI 96-170 of Max-Planck Institut für Mathematik, Bonn,
1-39.
[96.9] Bidegain F. : A Candidate for a Noncompact Quantum Group,
Lett. Math. Phys., Vol. 36, n°2, 157-167.
[96.10] Ushirobira R. : Sur la méthode des orbites pour
les algèbres de Lie des champs de vecteurs sur une courbe, C. R.
Acad. Sci. Paris, t. 323, Série I, 989-992.
[97.1] Dito G., Flato M., Sternheimer D. and Takhtajan L. : Deformation
Quantization and Nambu Mechanics, Commun. Math. Phys., 183, 1-22.
[97.2] Flato M., Simon J., Sternheimer D. et Taflin E. : Nonlinear
Relativistic Wave Equations in General Dimensions, in : "Collected Papers
on Geometry, Analysis and Mathematical Physics", in Honour of Professor
Gu Chao Hao ; Li Ta-Tsien, editor, World Scientific, 53-70.
[97.3] Dito G., Flato M. et Sternheimer D. : Nambu Mechanics,
N-ary
Operations and their Quantization. In : Sternheimer D., Rawnsley J. and
Gutt S. (eds.), Deformation Theory and Symplectic Geometry, Proceedings
of Ascona meeting, June 1996, Math. Physics Studies
vol.20, Dordrecht
: Kluwer, 43-66.
[97.4] Dito G. et Flato M. : Generalized Abelian Deformations
: Application to Nambu Mechanics, Lett. Math. Phys. 39,1-18.
[97.5] Flato M., Simon J. et Taflin E. : The Maxwell-Dirac equations
: the Cauchy problem, asymptotic completeness and the infrared problem,
Memoirs of the American Mathematical Society, vol.127 (n°606),
312 pages.
[97.6] Pinczon G. : On the equivalence between continuous and
differentiable deformation theories, Lett. Math. Phys. 39, 143-156.
[97.7] Pinczon G. : Non commutative deformation theory, Lett.
Math. Phys. 41, 101-117.
[97.8] Magnin L. : Cohomologie des groupes de Lie, l'hypothèse
de Riemann pour la cohomologie triviale des algèbres de Lie nilpotentes.
Actes de l'Université d'été Dijon 96, 52 pages.
[97.9] Magnin L. : Adjoint and Trivial Cohomology tables for
indecomposable nilpotent Lie algebras of dimension <7.
Livre électronique (906 pages) sur Internet ou sur Amer. Math. Soc.
Preprint Server.
[97.10] Semenov-Tian-Shansky M.: Quantum and Classical Integrable
Systems, in : Y. Kosmann-Schwarzbach, B. Grammatikos, K.M. Tamizhmani (Eds.),
Integrability of Nonlinear Systems, Proceedings of the CIMPA International
Winter School, Pondichery University, India, January 1996, pp.314-378.
Lecture Notes in Physics 495, Springer (1997).
[97.11] Moreno C., Valero L. : Star products in the triangular
case. Talk given at "Deformation Theory and Symplectic Geometry ", (Ascona
Meeting, June 1996), Mathematical Physics Studies 20, Kluwer Academic
Publishers.
[97.12] Moreno C., Valero L. : The Set of Equivalent Classes
of Invariant Star Products on a Lie Group, Journal of Geometry and
Physics, 23, 360-378.
[97.13] Semenov-Tian-Shansky M. et Sevostyanov A. : Classical
and Quantum Nonultralocal Systems on the Lattice , Algebraic Aspects of
Integrable Systems. I.M. Gelfand and A. Fokas, eds. Birkhäuser, 323-350.
[98.1] Araki H., Flato M., Michéa S., et Sternheimer D. :
Some Infinite Dimensional Algebras Arising in Spin Systems and in Particle
Physics and their Grand Algebra, Lett. Math. Phys. 43, 155-171.
[98.2] Nadaud F. : Generalized deformations, Koszul resolutions,
Moyal Products, Rev. Math. Phys. 10, n°5, 685-704.
[98.3] Semenov-Tian-Shansky M., Frenkel E. et Reshetikhin N. :
Drinfeld-Sokolov reduction for difference operators and deformations of
W-algebras. I. The case of Virasoro algebra. Commun. Math. Phys. 192,
605-629.
[98.4] Semenov-Tian-Shansky M. et Sevostyanov A. : Drinfeld-Sokolov
reduction for difference operators and deformations of W-algebras. II.
General semisimple case. Commun. Math. Phys. 192, 631-647.
[98.5] Flato M. , Fronsdal C. : Interacting
Singletons. Lett. Math. Phys. 44 (2), 249-259.
[98.6] Flato M. : Two disjoint Aspects of the Deformation
Programme : Quantizing Nambu Mechanics ; Singleton Physics, pp. 49-52 dans
Particles, Fields and Gravitation (J. Rembielinski ed.), AIP Conference
Proceedings 453, American Institute of Physics, Woodbury,
NY.
[98.7] Gautheron P. : Simple Facts Concerning Nambu Algebras,
Commun. Math. Phys, 195, 417-434.
[98.8] Moreno C., Valero L. : "Algèbres de Lie-Semenov
et groupes de Lie-Poisson". To appear in a book published by the Departement
of Mathemathics at the University of Coimbra (Portugal) (July 1998).
[98.9] Moreno C., Valero L. : "Poisson-Lie Groups and Lie Bialgebras".
A section in the book "Analysis, Manifolds and Physics " (Second Revised
Printing), by Yvonne Choquet-Bruhat and Cecile De Witt-Morette, North Holland.
(To be published).
[98.10] Moreno C., Valero L. : "Exact Poisson-Lie Groups and
the classical Yang-Baxter equation". A section in the book "Analysis,
Manifolds and Physics" (Second Revised Printing), by Yvonne Choquet-Bruhat
and Cecile De Witt-Morette, North Holland. (To be published).
[98.11] Angelopoulos E., Laoues M. : Masslessness in n
Dimensions, Reviews in Mathematical Physics, vol. 10, n°3, 271-299.
[98.12] Laoues M. : Some Properties of Massless Particles in
Arbitrary Dimensions, Reviews in Mathematical Physics, vol.10, n°8,
1079-1109.
[98.13] Bonneau P. : Fedosov Star-Products and 1-Differentiable
Deformations, Lett. Math. Phys. , n°45, n°4, 363-376.
[98.14] Matveev V. : Darboux transformations in associative rings
and functional-difference equations, CRM Proceedings and Lectures Notes,
14,
Bispectral Problems, 211-227, Amer. Math. Soc. (J. Harnad, A. Kasman Editors).
[98.15] Matveev V., Korotkin D.A. : On Solutions of Schlesinger
system and Ernst equation in terms of theta-functions, Preprint de l'Institut
Max-Planck für Gravitation-physik et Albert-Einstein-Institut AEI-087
(August 1998), 1-25.
[98.16] Sternheimer D. : Deformation Quantization : Twenty Years
After, (math. QA/9809056) pp.107-145 dans Particles, Fields and Gravitation
(J. Rembielinski ed.), AIP Conférence Proceedings 453, American
Institute of Physics, Woodbury, NY.
[98.17] Flato M., Sternheimer D. : The deformation programme in
physical theories : usual and unusual deformation quantization ; singleton
physics. Dans "Quantum Theory, in honour of Vladimir A. Fock",
Proceedings of the VIII Unesco International School of Physics, St
Petersburg (Yu. Novozhilov Ed.). Part I, pp. 10-37, Mittag-Leffler Report
No. 2, 1998/99.
[98.18] Moreno C. , Pereira da Silva J.A. : Algèbres de
Lie-Semenov et groupes de Lie-Poisson. Dans le livre Geometria e
Fisica-Matematica, p 171-189. Publié par le Département de
Mathématiques de l'Université de Coimbra, (Portugal).
[98.19] Ushirobira R. : On the orbit method for the Lie algebra
of vector fields on a curve, Journal of algebra, 203, 596-620.
[99.1] Arnal D., Ben Amar N. et Masmoudi M. : Cohomology of good
graphs and Kontsevich linear star products, Letters in Math. Phys. 48
, p. 291-306.
[99.2] Dito G. : On Generalized Abelian Deformations, Rev. Math.
Phys, 11, 711-725.
[99.3] Dito G : Kontsevich star-product on the Dual of a Lie
Algebra, Letters in Mathematical Physics, 48, 307-322.
[99.4] Flato M., Fronsdal C., Sternheimer D. : Singleton Physics,
(hep-th/9901043), Proceedings of Steklov Mathematical Institute, 226,
185-192.
[99.5] Flato M., Fronsdal C., Sternheimer D. : Singletons,
physics in AdS universe and oscillations of composite
neutrinos. Lett. Math. Phys. 1999, 48 (1), 109-119.
[99.6] Levasseur T., Ushirobira R. : Adjoint vector fields on
the tangent space of semi-simple symmetric spaces, Journal of Lie Theory, 9
, 293-304.
[99.7] Matveev V., Korotkin D.A. : Schlesinger systems Einstein
equations and hyperelliptic curves, Lett. Math. Phys, 49 , 145-159.
[99.8] Nadaud F. : On continuous and differential Hochschild
cohomology, Lett. Math. Phys., 47 (1999), 85-95.
[99.9] Semenov-Tian-Shansky M., Pirozerski A. : Q- pseudodifference
universal Drinfeld-Sokolov reduction. Proc. St. Petersburg Math. Soc., 7
, 169-199.
[00.1] Angelopoulos E., Laoues M. , Singletons on AdSn, dans
"Conference Moshé Flato 1999", Math. Physics Studies (Dito G. and Sternheimer
D. Eds), Kluwer Academic Publishers 2000, 2, 3-23.
[00.2] Arnal D., Baklouti A., Ludwig J. et Selmi M., Separation of
Unitary Representations of Exponential Lie Groups, Journal of Lie Theory,
vol. 10, 2, 399-410.
[00.3] Arnal D., Ben Amar N. , Kontsevich wheels and invariant
polynomial functions on the dual of Lie algebras, Letters in
Math. Phys. Vol. 52, 4, 291-300.
[00.4] Arnal D., Dali B.,, Déformations polarisées d'algèbres sur
les orbites coadjointes des groupes exponentiels, Annales de la Faculté des
Sciences de Toulouse, 6 IX , 31-54.
[00.5] Bonneau P., Classifications of star products and deformations
of Poisson brackets, Banach Center Publ., 51 , 25-29.
[00.6] Dito G. et Sternheimer D., Eds, Conférence Moshé Flato 1999,
2 volumes (21 & 22) de Math. Physics Studies, x+428+vi+348p. Kluwer
Acad. Publ.
[00.7] Fedosov B.,, The Atiya-Bott-Patodi Method in Deformation
Quantization, Comm. Math. Phys., 209 , 691-728.
[00.8] Matveev V,. Darboux Transformations, Covariance Theorems and
Integrable Systems in AMS volume : L.D. Faddeev's seminar on Mathematical
Physics (M.A. Semenov Tyan-Schansky, ed.) ser. Advances in the Mathematical
Sciences-49, Amer. Math. Soc. Translations series 2, 201 , 179-209
Providence, R.I.
[00.9] Matveev V., Korotkin D.A. ,Theta functional solutions of the
Ernst equation and Schlesinger system, Russian Journal Funktsional'nyj Analiz
i Ego Prilozheniya, 34 , 18-34, October-December 2000 (in Russian)
translated in English in Functional Analysis and its Applications, 34
, 252-264 Kluwer Academic/Plenum Publishers.
[00.10] Moreno C., Completely Integrable Systems, in the book
"Analysis, Manifolds and Physics", Part II by Yvonne Choquet-Bruhat and
Cécile De Witt-Morette, 219-233, North Holland.
[00.11] Moreno C., Poisson Manifolds II in the book "Analysis,
Manifolds and Physics", Part II by Yvonne Choquet-Bruhat and CE9cile De
Witt-Morette, 200-219, North Holland.
[00.12] Moreno C., Pereira da Silva J.A.,, Star-products, spectral
analysis, and hyperfunctions dans "Conference Moshé Flato 1999",
Math. Physics Studies (Dito G. and Sternheimer D. Eds), 2 , 211-224,
Kluwer Academic Publishers.
[00.13] Moreno C., Valero L., Poisson-Lie Groups in the book
"Analysis, Manifolds and Physics", Part II by Yvonne Choquet-Bruhat and
Cécile De Witt-Morette, 443-476, North Holland.
[00.14] Moreno C., Valero L., Star products in the triangular
case. Mathematical Physics Studies, 20 , 345-352. Kluwer Academic
Publishers.
[00.15] Semenov-Tian-Shansky M., editor, L. D. Faddeev's Seminar on
Mathematical Physics, Advances in the Mathematical Sciences, 201,
Amer.Math. Soc., Providence, R.I., 320 pp.
[00.16] Semenov-Tian-Shansky M., Pirozerski A., Generalized
q-deformed Gelfand-Dickey structures on the group of q-pseudodifference
operators, in L. D. Faddeev's Seminar on Mathematical Physics, Advances in
the Mathematical Sciences, 201 , Amer. Math.Soc., Providence, R.I.
[00.17] Simon J., Taflin E., Nonlinear relativistic evolution
equations : Survey of a new approach, G. Dito and D. Sternheimer (eds.),
Conference Moshé Flato 1999, 1 , 389-402, Kluwer Academic Publishers.
[00.18] Sternheimer D., In retrospect : a personal view of Moshé
Flato's scientific legacy, dans "Conférence Moshé Flato 1999", Math. Physics
Studies (Dito G. and Sternheimer D. Eds), Kluwer Acad. Publ., 21 ,
31-41.
[01.1] Angelopoulos E., Classification of Simple Lie Algebras, Pan
American Journal of Mathematics, vol 11, 2 , 65-79.
[01.2] Arnal D., Ben Amar N., g-relative star products, Letters in
Mathematical Physics, 55 (1), 33-42.
[01.3] Arnal D., Boukary Baoua O., Benson C., Ratcliff G., Invariant
theory for the orthogonal group via star products, Journal of Lie theory,
11 (2) , 441-458.
[01.4] Arnal D., Tlili M.H., Préquantifications et produit star de
Berezin sur GL(n,C), Travaux Mathématiques du Centre Univ. de Lux., XII
, 21-39.
[01.5] Cohen A.M., Steinbach A., Ushirobira R., Wales D.B. Lie
algebras generated by extremal elements, Journal of Algebra, 236 ,
122-154.
[01.6] Dito G. et Sternheimer D. Eds, Proceedings of the
Euroconference Moshé Flato 2000, Letters in Mathematical Physics, 56 1, 2
et 3.
[01.7] Kharchev S., Lebedev D., Semenov-Tian-Shansky M. Unitary
representations of the modular and two-particle q-deformed Toda
chains. Integrable structures of exactly solvable two-dimensional models of
quantum field theory (Kiev, 2000), 223-242, NATO Sci. Ser. II
Math. Phys. Chem., 35 , Kluwer Acad. Publ., Dordrecht.
[01.8] Lesimple M., Pinczon G., Deformations of the Metaplectic
Representations, J. Math. Phys., 42 (4), 1887-1899.
[01.9] Martin C., Conley C. A new Family of irreducible
representations of the Witt Lie algebra, Compositio Mathematica, 128
, 153-175.
[01.10] Matveev V. Intertwinning relations between Fourier transform
and discrete Fourier transform, the related functional identities and beyond,
Inverse Problems, 17 , 633-657.
[01.11] Moreno C., Teles J., Preferred quantizations of nondegenerate
triangular lie bialgebras and Drinfeld associators. In the book "Recent
advances in Lie Theory", 347-366, Heldermann Verlag, Berlin, ISBN
3-88538-225-3;
[02.1] Arnal D., Manchon D., Masmoudi M. , Choix des signes pour la
formalité de Kontsevich, Pacific Journal of Mathematics, 203 (1) ,
23-66.
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THÈSES OU HABILITATIONS SOUTENUES dans l'équipe
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13/01/92 Martin C. (Habilitation): Représentations
d'algèbres de Lie de dimension finie et infinie.
14/04/92 Bennour A. (Thèse) Symétrisation
des algèbres de Lie 3.3cm graduées.
17/09/92 Lu Z.C. (Thèse) Groupes quantiques en espace
de phase.
24/09/92 Patsourakos A. (Thèse) Sur les algèbres
de Lie libres.
04/02/93 Benayadi S. (Thèse) Etude d'une famille
d'algèbres de Lie qui généralisent les algébres
de Lie semi-simples.
11/02/93 Dito J. (Thèse) Star-produits en dimension
infinie.
23/09/93 Bonneau P. (Thèse) Groupes quantiques:
Deformations et Cohomologies.
24/03/94 Ben Amor H. (Habilitation) Superalgèbres
de Lie : modules et déformations.
19/09/95 Bidegain F. (Thèse) Modèles des Groupes
Quantiques non compacts.
10/10/97 Zouagui M. (Thèse) Sur les groupes quantiques
de Lorentz.
08/04/98 Gautheron P. (Thèse) Nouvelles structures
mathématiques autour de la mécanique de Nambu.
11/06/98 Laoues M. (Thèse) Représentations
de masse nulle en dimension arbitraire d'espace-temps de De Sitter et de
Minkowski.
11/06/98 Vartanian A. (Thèse) Comportement
asymptotique des solutions du problème de Cauchy pour l'équation
de Schrödinger nonlinéaire modifiée.
07/01/99 Michéa S. (Thèse) Quelques
applications des groupes de Lie de dimension infinie en systèmes
de Spins et en théorie topologique des champs.
21/01/00 François Nadaud (Thèse) Déformations et
déformations généralisées
09/02/01 Alexei Pirozerski (Thèse) Crochets de
Gelfand-Dickey q-deformés et la q-reduction de Drinfeld-Sokolov universelle
08/07/02 Igor Bogdanoff (Thèse) Etat topologique de
l'espace-temps à l'échelle zéro
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