Chris A. M. Peters

Mixed hodge structures - Heidelberg: Springer-Verlag, [c2008] - 470 p - A Series of Modern Surveys in Mathematics Vo. 52 .

Introduction

I. Basic Hodge Theory
1. Compact Kähler Manifolds
2. Pure Hodge Structures
3. Abstract Aspects of Mixed Hodge Structures

II. Mixed Hodge Structures on Cohomology Groups
4. Smooth Varieties
5. Singular Varieties
6. Singular Varieties: Complementary Results
7. Applications to Algebraic Cycles and to Singularities

III. Mixed Hodge Structures on Homotopy Groups
8. Hodge Theory and Iterated Integrals
9. Hodge Theory and Minimal Models

IV. Hodge Structures and Local Systems
10. Variations of Hodge Structure
11. Degenerations of Hodge Structures
12. Applications of Asymptotic Hodge Theory
13. Perverse Sheaves and D-Modules
14. Mixed Hodge Modules

V. Appendices

The text of this book has its origins more than twenty- ve years ago. In the seminar of the Dutch Singularity Theory project in 1982 and 1983, the second-named author gave a series of lectures on Mixed Hodge Structures and Singularities, accompanied by a set of hand-written notes. The publication of these notes was prevented by a revolution in the subject due to Morihiko Saito: the introduction of the theory of Mixed Hodge Modules around 1985. Understanding this theory was at the same time of great importance and very hard, due to the fact that it uni es many di erent theories which are quite complicated themselves: algebraic D-modules and perverse sheaves. The present book intends to provide a comprehensive text about Mixed Hodge Theory with a view towards Mixed Hodge Modules. The approach to Hodge theory for singular spaces is due to Navarro and his collaborators, whose results provide stronger vanishing results than Deligne’s original theory. Navarro and Guill en also lled a gap in the proof that the weight ltration on the nearby cohomology is the right one. In that sense the present book corrects and completes the second-named author’s thesis. --- summary provided by publisher

9783540770152


Homological algebra

QA564