Compact Complex Surfaces

Compact Complex Surfaces

1995 | 438 Pages | ISBN: 3540008322 | PDF | 38.2 MB

In the 19 years which passed since the first edition was published, several important developments have taken place in the theory of surfaces. The most sensational one concerns the differentiable structure of surfaces. Twenty years ago very little was known about differentiable structures on 4-manifolds, but in the meantime Donaldson on the one hand and Seiberg and Witten on the other hand, have found, inspired by gauge theory, totally new invariants. Strikingly, together with the theory explained in this book these invariants yield a wealth of new results about the differentiable structure of algebraic surfaces. Other developments include the systematic use of nef-divisors (in ac- cordance with the progress made in the classification of higher dimensional algebraic varieties), a better understanding of Kahler structures on surfaces, and Reider's new approach to adjoint mappings. All these developments have been incorporated in the present edition, though the Donaldson and Seiberg-Witten theory only by way of examples. Of course we use the opportunity to correct some minor mistakes, which we ether have discovered ourselves or which were communicated to us by careful readers to whom we are much obliged.

Download:

http://longfiles.com/4s7u3blr2pkr/Compact_Complex_Surfaces.pdf.html

[Fast Download] Compact Complex Surfaces


Ebooks related to "Compact Complex Surfaces" :
Mathematical Models of Viscous Friction
Time-Varying Vector Fields and Their Flows
Finite Difference Methods,Theory and Applications
ESL Mathematics for Standardized Tests
Advances in Discrete Tomography and Its Applications
The Numerical Solution of Ordinary and Partial Differential Equations
Advanced Algebra (Cornerstones)
Optimal Control of Partial Differential Equations by Karl-Heinz Hoffmann
Lore of Large Numbers
Linear Algebra via Exterior Products
Copyright Disclaimer:
This site does not store any files on its server. We only index and link to content provided by other sites. Please contact the content providers to delete copyright contents if any and email us, we'll remove relevant links or contents immediately.