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Period Mappings with Applications to Symplectic Complex Spaces de Tim Kirschner

Period Mappings with Applications to Symplectic Complex Spaces: Lecture Notes in Mathematics, cartea 2140

Autor Tim Kirschner
en Limba Engleză Paperback – 25 sep 2015
Extending Griffiths’ classical theory of period mappings for compact Kähler manifolds, this book develops and applies a theory of period mappings of “Hodge-de Rham type” for families of open complex manifolds. The text consists of three parts. The first part develops the theory. The second part investigates the degeneration behavior of the relative Frölicher spectral sequence associated to a submersive morphism of complex manifolds. The third part applies the preceding material to the study of irreducible symplectic complex spaces. The latter notion generalizes the idea of an irreducible symplectic manifold, dubbed an irreducible hyperkähler manifold in differential geometry, to possibly singular spaces. The three parts of the work are of independent interest, but intertwine nicely.
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Specificații

ISBN-13: 9783319175201
ISBN-10: 3319175203
Pagini: 240
Ilustrații: XVIII, 275 p.
Dimensiuni: 155 x 235 x 22 mm
Greutate: 0.42 kg
Ediția:1st ed. 2015
Editura: Springer International Publishing
Colecția Springer
Seria Lecture Notes in Mathematics

Locul publicării:Cham, Switzerland

Public țintă

Research

Recenzii

“The book under review aims to extend a number of methods and results from algebraic geometry (schemes and algebraic varieties) to the theory of complex analytic spaces. … The book is very clearly written, with almost all prerequisites collected in two appendices. In this way it is interesting not only for the original results it contains, but also as an introduction to this area lying at the intersection of algebraic and complex geometry.” (Andrei D. Halanay, Mathematical Reviews, December, 2016) 

Textul de pe ultima copertă

Extending Griffiths’ classical theory of period mappings for compact Kähler manifolds, this book develops and applies a theory of period mappings of “Hodge-de Rham type” for families of open complex manifolds. The text consists of three parts. The first part develops the theory. The second part investigates the degeneration behavior of the relative Frölicher spectral sequence associated to a submersive morphism of complex manifolds. The third part applies the preceding material to the study of irreducible symplectic complex spaces. The latter notion generalizes the idea of an irreducible symplectic manifold, dubbed an irreducible hyperkähler manifold in differential geometry, to possibly singular spaces. The three parts of the work are of independent interest, but intertwine nicely.

Caracteristici

Presents sheaves with a clear connection to the set-theoretic foundations Strives for a maximum of rigor (concerning proofs, statements, definitions, and notation) Overcomes the “canonical isomorphism” paradigm; all morphisms are given/constructed explicitly Introduces a Gauß-Manin connection for families of possibly non-compact manifolds Includes supplementary material: sn.pub/extras