Halbout, Gilles - Département de Mathématiques, Université Montpellier II

• Deformation quantization, methods and applications
• Nouvelles structures sur une alg ebre de Lie Table des mati eres
• CALCUL D'UN INVARIANT DE STAR-PRODUIT E SUR UNE VARI
• COBOUNDARY LIE BIALGEBRAS AND COMMUTATIVE SUBALGEBRAS OF UNIVERSAL ENVELOPING ALGEBRAS
• hadic valuation property of universal Rmatrices
• Lifts and braidings of quasitriangular Lie bialgebras: existence and uniqueness
• BRAIDING STRUCTURES ON FORMAL POISSON GROUPS AND CLASSICAL SOLUTIONS OF THE QYBE
• QUANTIZATION OF COBOUNDARY LIE BIALGEBRAS BENJAMIN ENRIQUEZ AND GILLES HALBOUT
• Poisson algebras associated to quasi-Hopf algebras Benjamin Enriquez and Gilles Halbout
• G# formality theorem in terms of graphs and associated ChevalleyEilenbergHarrison
• QUANTIZATION OF POISSONHOPF STACKS ASSOCIATED WITH GROUP LIE BIALGEBRAS
• COMPARAISON DES D EFORMATIONS
• G-formality theorem in terms of graphs and associated Chevalley-Eilenberg-Harrison
• Formalite G# adaptee et starrepresentations sur des sousvarietes cosotropes
• Globalization of Tamarkin's formality theorem Gilles Halbout
• Lifts of C and L morphisms to G morphisms Gregory Ginot (a) and Gilles Halbout (b)
• Quantization of r -Z-quasi-Poisson manifolds and related modified classical dynamical r-matrices
• Poisson algebras associated to quasiHopf algebras Benjamin Enriquez and Gilles Halbout
• NONCOMMUTATIVE POISSON STRUCTURES ON ORBIFOLDS GILLES HALBOUT AND XIANG TANG
• M. M. F. A. I. RAPPORT DE MAGIST
• FORMALITY THEOREMS: FROM ASSOCIATORS TO A GLOBAL FORMULATION
• I.R.M.A U.L.P Habilitation a Diriger des
• FORMALITY THEOREM FOR LIE BIALGEBRAS AND QUANTIZATION OF TWISTS AND COBOUNDARY r-MATRICES
• DUNKL OPERATOR AND QUANTIZATION OF Z2-SINGULARITY GILLES HALBOUT AND XIANG TANG
• QUANTIZATION OF POISSON-HOPF STACKS ASSOCIATED WITH GROUP LIE BIALGEBRAS
• QUANTIZATION OF QUASI-LIE BIALGEBRAS BENJAMIN ENRIQUEZ AND GILLES HALBOUT
• A h-adic valuation property of universal R-matrices
• BRAIDING STRUCTURES ON FORMAL POISSON GROUPS AND CLASSICAL SOLUTIONS OF THE QYBE
• Rencontre autour des invariants de Chern-Simons
• Description de S(H) . Th eor eme de Chevalley
• QUANTIZATION OF COBOUNDARY LIE BIALGEBRAS BENJAMIN ENRIQUEZ AND GILLES HALBOUT
• A FORMALITY THEOREM FOR POISSON MANIFOLDS Gregory Ginot & Gilles Halbout
• Alg ebre homologique / Homological Algebra HOMOTOPIE EXPLICITE EN (CO)HOMOLOGIE DE HOCHSCHILD
• FORMALITY THEOREM FOR LIE BIALGEBRAS AND QUANTIZATION OF TWISTS AND COBOUNDARY rMATRICES
• WEAK QUANTIZATION OF POISSON STRUCTURES DAMIEN CALAQUE AND GILLES HALBOUT
• FORMALITY THEOREMS FOR HOCHSCHILD CHAINS IN THE LIE ALGEBROID SETTING
• FORMULE D'HOMOTOPIE ENTRE LES COMPLEXES DE HOCHSCHILD ET DE DE RHAM
• TRESSAGES DES GROUPES DE POISSON A DUAL QUASITRIANGULAIRE
• Formalite G adaptee et star-representations sur des sous-varietes coisotropes
• QUANTIZATION OF -LIE BIALGEBRAS BENJAMIN ENRIQUEZ AND GILLES HALBOUT
• Lifts of C and L-morphisms to G-morphisms Gregory Ginot(a) and Gilles Halbout(b)
• Formality conjectures and deformation Gilles Halbout
• INSTITUT DE RECHERCHE MATH EMATIQUE AVANC
• FLMA103 -ALG`EBRE LINEAIRE 1 -2008/09 FEUILLE TD N
• DEFORMATION OF LINEAR POISSON ORBIFOLD GILLES HALBOUT, JEAN-MICHEL OUDOM, AND XIANG TANG
• M. M. F. A. I. RAPPORT DE MAGISTE`RE
• Nouvelles structures sur une alg'ebre de Lie G. Halbout
• INSTITUT DE RECHERCHE MATH'EMATIQUE AVANC'EE Universit'e Louis Pasteur et C.N.R.S. (UMR 7501)
• NONCOMMUTATIVE POISSON STRUCTURES ON ORBIFOLDS GILLES HALBOUT AND XIANG TANG
• FORMALITY THEOREMS FOR HOCHSCHILD CHAINS IN THE LIE ALGEBROID SETTING
• QUANTIZATION OF #LIE BIALGEBRAS BENJAMIN ENRIQUEZ AND GILLES HALBOUT
• Construction des alg ebres de Lie semi-simples Table des mati eres
• COBOUNDARY LIE BIALGEBRAS AND COMMUTATIVE SUBALGEBRAS OF UNIVERSAL ENVELOPING ALGEBRAS
• WEAK QUANTIZATION OF POISSON STRUCTURES DAMIEN CALAQUE AND GILLES HALBOUT
• Globalization of Tamarkin's formality theorem Gilles Halbout
• Lifts and braidings of quasitriangular Lie bialgebras: existence and uniqueness
• CONSTRUCTION PAR DUALIT EBRES DE KAC-MOODY SYM
• W Description de S(H) . Th'eor`eme de Chevalley