Introduction To Hodge Theory
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| Author | : Claire Voisin |
| Publisher | : Cambridge University Press |
| Total Pages | : 334 |
| Release | : 2007-12-20 |
| Genre | : Mathematics |
| ISBN | : 9780521718011 |
This is a modern introduction to Kaehlerian geometry and Hodge structure. Coverage begins with variables, complex manifolds, holomorphic vector bundles, sheaves and cohomology theory (with the latter being treated in a more theoretical way than is usual in geometry). The book culminates with the Hodge decomposition theorem. In between, the author proves the Kaehler identities, which leads to the hard Lefschetz theorem and the Hodge index theorem. The second part of the book investigates the meaning of these results in several directions.
| Author | : Matt Kerr |
| Publisher | : Cambridge University Press |
| Total Pages | : 533 |
| Release | : 2016-02-04 |
| Genre | : Mathematics |
| ISBN | : 110754629X |
Combines cutting-edge research and expository articles in Hodge theory. An essential reference for graduate students and researchers.
| Author | : Hossein Movasati |
| Publisher | : |
| Total Pages | : 0 |
| Release | : 2021 |
| Genre | : Hodge theory |
| ISBN | : 9781571464002 |
Offers an examination of the precursors of Hodge theory: first, the studies of elliptic and abelian integrals by Cauchy, Abel, Jacobi, and Riemann; and then the studies of two-dimensional multiple integrals by Poincare and Picard. The focus turns to the Hodge theory of affine hypersurfaces given by tame polynomials.
| Author | : James Carlson |
| Publisher | : Cambridge University Press |
| Total Pages | : 577 |
| Release | : 2017-08-24 |
| Genre | : Mathematics |
| ISBN | : 1108422624 |
An introduction to Griffiths' theory of period maps and domains, focused on algebraic, group-theoretic and differential geometric aspects.
| Author | : José Bertin |
| Publisher | : American Mathematical Soc. |
| Total Pages | : 254 |
| Release | : 2002 |
| Genre | : Mathematics |
| ISBN | : 9780821820407 |
Hodge theory originated as an application of harmonic theory to the study of the geometry of compact complex manifolds. The ideas have proved to be quite powerful, leading to fundamentally important results throughout algebraic geometry. This book consists of expositions of various aspects of modern Hodge theory. Its purpose is to provide the nonexpert reader with a precise idea of the current status of the subject. The three chapters develop distinct but closely related subjects:$L2$ Hodge theory and vanishing theorems; Frobenius and Hodge degeneration; variations of Hodge structures and mirror symmetry. The techniques employed cover a wide range of methods borrowed from the heart of mathematics: elliptic PDE theory, complex differential geometry, algebraic geometry incharacteristic $p$, cohomological and sheaf-theoretic methods, deformation theory of complex varieties, Calabi-Yau manifolds, singularity theory, etc. A special effort has been made to approach the various themes from their most na The reader should have some familiarity with differential and algebraic geometry, with other prerequisites varying by chapter. The book is suitable as an accompaniment to a second course in algebraic geometry.
| Author | : Chris A.M. Peters |
| Publisher | : Springer Science & Business Media |
| Total Pages | : 467 |
| Release | : 2008-02-27 |
| Genre | : Mathematics |
| ISBN | : 3540770178 |
This is comprehensive basic monograph on mixed Hodge structures. Building up from basic Hodge theory the book explains Delingne's mixed Hodge theory in a detailed fashion. Then both Hain's and Morgan's approaches to mixed Hodge theory related to homotopy theory are sketched. Next comes the relative theory, and then the all encompassing theory of mixed Hodge modules. The book is interlaced with chapters containing applications. Three large appendices complete the book.
| Author | : Mark Green |
| Publisher | : American Mathematical Soc. |
| Total Pages | : 314 |
| Release | : 2013-11-05 |
| Genre | : Mathematics |
| ISBN | : 1470410125 |
This monograph presents topics in Hodge theory and representation theory, two of the most active and important areas in contemporary mathematics. The underlying theme is the use of complex geometry to understand the two subjects and their relationships to one another--an approach that is complementary to what is in the literature. Finite-dimensional representation theory and complex geometry enter via the concept of Hodge representations and Hodge domains. Infinite-dimensional representation theory, specifically the discrete series and their limits, enters through the realization of these representations through complex geometry as pioneered by Schmid, and in the subsequent description of automorphic cohomology. For the latter topic, of particular importance is the recent work of Carayol that potentially introduces a new perspective in arithmetic automorphic representation theory. The present work gives a treatment of Carayol's work, and some extensions of it, set in a general complex geometric framework. Additional subjects include a description of the relationship between limiting mixed Hodge structures and the boundary orbit structure of Hodge domains, a general treatment of the correspondence spaces that are used to construct Penrose transforms and selected other topics from the recent literature. A co-publication of the AMS and CBMS.
| Author | : Günter Schwarz |
| Publisher | : Springer |
| Total Pages | : 161 |
| Release | : 2006-11-14 |
| Genre | : Mathematics |
| ISBN | : 3540494030 |
Hodge theory is a standard tool in characterizing differ- ential complexes and the topology of manifolds. This book is a study of the Hodge-Kodaira and related decompositions on manifolds with boundary under mainly analytic aspects. It aims at developing a method for solving boundary value problems. Analysing a Dirichlet form on the exterior algebra bundle allows to give a refined version of the classical decomposition results of Morrey. A projection technique leads to existence and regularity theorems for a wide class of boundary value problems for differential forms and vector fields. The book links aspects of the geometry of manifolds with the theory of partial differential equations. It is intended to be comprehensible for graduate students and mathematicians working in either of these fields.
| Author | : Claire Voisin |
| Publisher | : Cambridge University Press |
| Total Pages | : 362 |
| Release | : 2007-12-20 |
| Genre | : Mathematics |
| ISBN | : 9780521718028 |
The second volume of this modern account of Kaehlerian geometry and Hodge theory starts with the topology of families of algebraic varieties. The main results are the generalized Noether-Lefschetz theorems, the generic triviality of the Abel-Jacobi maps, and most importantly, Nori's connectivity theorem, which generalizes the above. The last part deals with the relationships between Hodge theory and algebraic cycles. The text is complemented by exercises offering useful results in complex algebraic geometry. Also available: Volume I 0-521-80260-1 Hardback $60.00 C
| Author | : Claire Voisin |
| Publisher | : Cambridge University Press |
| Total Pages | : 336 |
| Release | : 2002-12-05 |
| Genre | : Mathematics |
| ISBN | : 1139437690 |
The first of two volumes offering a modern introduction to Kaehlerian geometry and Hodge structure. The book starts with basic material on complex variables, complex manifolds, holomorphic vector bundles, sheaves and cohomology theory, the latter being treated in a more theoretical way than is usual in geometry. The author then proves the Kaehler identities, which leads to the hard Lefschetz theorem and the Hodge index theorem. The book culminates with the Hodge decomposition theorem. The meanings of these results are investigated in several directions. Completely self-contained, the book is ideal for students, while its content gives an account of Hodge theory and complex algebraic geometry as has been developed by P. Griffiths and his school, by P. Deligne, and by S. Bloch. The text is complemented by exercises which provide useful results in complex algebraic geometry.
