D-module theory is essentially the algebraic study of systems of linear partial differential equations. This book, the first devoted specifically to holonomic D-modules, provides a unified treatment of both regular and irregular D-modules. The authors begin by recalling the main results of the theory of indsheaves and subanalytic sheaves, explaining in detail the operations on D-modules and their tempered holomorphic solutions. As an application, they obtain the Riemann–Hilbert correspondence for regular holonomic D-modules. In the second part of the book the authors do the same for the sheaf of enhanced tempered solutions of (not necessarily regular) holonomic D-modules. Originating from a series of lectures given at the Institut des Hautes Études Scientifiques in Paris, this book is addressed to graduate students and researchers familiar with the language of sheaves and D-modules, in the derived sense.
Table of Contents
Introduction; 1. A review on sheaves and D-modules; 2. Indsheaves; 3. Tempered solutions of D-modules; 4. Regular holonomic D-modules; 5. Indsheaves on bordered spaces; 6. Enhanced indsheaves; 7. Holonomic D-modules; 8. Integral transforms; References; List of notations; Index.