- Contemporary Mathematics Deformation quantization modules on complex symplectic
- Abelian Sheaves Pierre Schapira
- Micro-support and Cauchy problem for temperate solutions of regular D-Modules
- SHEAVES: FROM LERAY TO GROTHENDIECK AND SATO Pierre Schapira
- Pourquoi l'Universite doit etre au centre de la formation des enseignants 1
- RadonPenrose transform for Dmodules Andrea D'Agnolo Pierre Schapira
- Elliptic Pairs II. Euler Class and Relative Index Theorem Pierre Schapira JeanPierre Schneiders
- Masaki Kashiwara Pierre Schapira
- Digital Object Identifier (DOI) 10.1007/s00220-007-0250-2 Commun. Math. Phys. 273, 395414 (2007)
- From Dmodules to deformation quantization Pierre Schapira
- BULLETIN (New Series) OF THE AMERICAN MATHEMATICAL SOCIETY
- IndSheaves, distributions, and microlocalization Masaki Kashiwara & Pierre Schapira
- General Topology Course at Paris VI University, 2010/2011 (v.3)
- Hyperfunctions and LPDE Solutions to the exam, June 9, 2011.
- L'Ecole de Kyoto et l'Analyse Alg ebrique Pierre Schapira
- Algebra and Topology Course at Paris VI University, 2007/2008 1
- Differential Calculus Course at Paris VI University, 20010/2011 (v.2)
- Mikio Sato, a visionary of mathematics Pierre Schapira
- Mikio Sato, a visionary of mathematics # Pierre Schapira
- Publ. RIMS, Kyoto Univ. Regular holonomic D [[#]]modules
- Kyoto.tex : 2008/9/16 (18:1) page: 1 Advanced Studies in Pure Mathematics ,
- General Topology Course at Paris VI University, 2010/2011 (v.3)
- Di#erential Calculus Course at Paris VI University, 20010/2011 (v.2)
- Leray's quantization of projective duality Andrea D'Agnolo Pierre Schapira
- Categories and homological algebra An introduction to derived categories
- Triangulated categories for the analysts Pierre Schapira
- Modules over deformation quantization algebroids: an overview
- Quantization of complex Lagrangian submanifolds
- Hyperfunctions and Linear Partial Differential Pierre Schapira
- Hyperfunctions and LPDE Solutions to the exam, June 9, 2011.
- Abelian Sheaves Pierre Schapira
- From D-modules to deformation quantization Pierre Schapira
- Contemporary Mathematics Deformation quantization modules on complex symplectic
- The RadonPenrose correspondence II: Line bundles and simple Dmodules
- Categories, sites, sheaves and stacks Course at University of Paris VI
- Modules over deformation quantization algebroids: an overview
- Categories and homological algebra An introduction to derived categories
- Microlocal study of ind-sheaves I: micro-support and regularity
- Hyperfunctions and LPDE Exam, June 9, 2011. 14h16h
- Triangulated categories for the analysts Pierre Schapira
- Algebra and Topology Course at Paris VI University, 2007/2008 1
- SHEAVES: FROM LERAY TO GROTHENDIECK AND SATO Pierre Schapira
- Advanced Studies in Pure Mathematics , Masaki Kashiwara and Algebraic Analysis
- Pourquoi l'Universite doit ^etre au centre de la formation des enseignants1
- Publ. RIMS, Kyoto Univ. Regular holonomic D[[ ]]-modules
- Eloge du Professeur Yuri MANIN Directeur du Max-Plank Institute fur Mathematik, Bonn
- Tomographie topologique Pierre Schapira
- Cat egories et recollements Pierre Schapira
- Quantization of complex Lagrangian submanifolds
- Emmanuel Andronikof Pierre Schapira
- An algebra of deformation quantization for starexponentials on complex symplectic manifolds
- Leray et l'analyse alg'ebrique Pierre Schapira
- Ind-Sheaves, distributions, and microlocalization Masaki Kashiwara & Pierre Schapira
- Radon-Penrose transform for D-modules Andrea D'Agnolo Pierre Schapira
- GLOBAL PROPAGATION ON CAUSAL MANIFOLDS ANDREA D'AGNOLO AND PIERRE SCHAPIRA
- Boundary values, Fourier-Sato tranform and Laplace transform
- Tomography of constructible functions P. Schapira
- Constructibility and duality for simple holonomic modules on complex symplectic manifolds
- D'efense du conceptuel Pierre Schapira 1
- GLOBAL PROPAGATION ON CAUSAL MANIFOLDS ANDREA D'AGNOLO AND PIERRE SCHAPIRA
- An algebra of deformation quantization for star-exponentials on complex symplectic manifolds
- Constructibility and duality for simple holonomic modules on complex symplectic manifolds
- Quantization of complex Lagrangian submanifolds
- Hyperfunctions and Linear Partial Di#erential Pierre Schapira
- Boundary values, FourierSato tranform and Laplace transform
- Constructibility and duality for simple holonomic modules on complex symplectic manifolds
- Categories, sites, sheaves and stacks Course at University of Paris VI
- Leray's quantization of projective duality Andrea D'Agnolo Pierre Schapira
- The Radon-Penrose correspondence II: Line bundles and simple D-modules
- Microlocal study of ind-sheaves I: micro-support and regularity
- Micro-support and Cauchy problem for temperate solutions of regular D-Modules
- Elementary Sheaf Theory for the Analysts Pierre Schapira
- Deformation quantization modules Masaki Kashiwara and Pierre Schapira
- Pierre Schapira January 30, 2008
- Elementary Sheaf Theory for the Analysts Pierre Schapira
- Moderate and formal cohomology associated with constructible sheaves
- Elliptic Pairs I. Relative Finiteness and Duality Pierre Schapira JeanPierre Schneiders
- Pierre Schapira January 30, 2008
- Deformation quantization modules Masaki Kashiwara and Pierre Schapira
