Ebook: Frobenius Splitting Methods in Geometry and Representation Theory
- Tags: Algebraic Geometry, Group Theory and Generalizations
- Series: Progress in Mathematics 231
- Year: 2005
- Publisher: Birkhäuser Basel
- Edition: 1
- Language: English
- pdf
The theory of Frobenius splittings has made a significant impact in the study of the geometry of flag varieties and representation theory. This work, unique in book literature, systematically develops the theory and covers all its major developments.
Key features:
* Concise, efficient exposition unfolds from basic introductory material on Frobenius splittings—definitions, properties and examples—to cutting edge research
* Studies in detail the geometry of Schubert varieties, their syzygies, equivariant embeddings of reductive groups, Hilbert Schemes, canonical splittings, good filtrations, among other topics
* Applies Frobenius splitting methods to algebraic geometry and various problems in representation theory
* Many examples, exercises, and open problems suggested throughout
* Comprehensive bibliography and index
This book will be an excellent resource for mathematicians and graduate students in algebraic geometry and representation theory of algebraic groups.
The theory of Frobenius splittings has made a significant impact in the study of the geometry of flag varieties and representation theory. This work, unique in book literature, systematically develops the theory and covers all its major developments.
Key features:
* Concise, efficient exposition unfolds from basic introductory material on Frobenius splittings—definitions, properties and examples—to cutting edge research
* Studies in detail the geometry of Schubert varieties, their syzygies, equivariant embeddings of reductive groups, Hilbert Schemes, canonical splittings, good filtrations, among other topics
* Applies Frobenius splitting methods to algebraic geometry and various problems in representation theory
* Many examples, exercises, and open problems suggested throughout
* Comprehensive bibliography and index
This book will be an excellent resource for mathematicians and graduate students in algebraic geometry and representation theory of algebraic groups.
The theory of Frobenius splittings has made a significant impact in the study of the geometry of flag varieties and representation theory. This work, unique in book literature, systematically develops the theory and covers all its major developments.
Key features:
* Concise, efficient exposition unfolds from basic introductory material on Frobenius splittings—definitions, properties and examples—to cutting edge research
* Studies in detail the geometry of Schubert varieties, their syzygies, equivariant embeddings of reductive groups, Hilbert Schemes, canonical splittings, good filtrations, among other topics
* Applies Frobenius splitting methods to algebraic geometry and various problems in representation theory
* Many examples, exercises, and open problems suggested throughout
* Comprehensive bibliography and index
This book will be an excellent resource for mathematicians and graduate students in algebraic geometry and representation theory of algebraic groups.
Content:
Front Matter....Pages i-ix
Frobenius Splitting: General Theory....Pages 1-58
Frobenius Splitting of Schubert Varieties....Pages 59-81
Cohomology and Geometry of Schubert Varieties....Pages 83-107
Canonical Splitting and Good Filtration....Pages 109-152
Cotangent Bundles of Flag Varieties....Pages 153-182
Equivariant Embeddings of Reductive Groups....Pages 183-206
Hilbert Schemes of Points on Surfaces....Pages 207-230
Back Matter....Pages 231-250
The theory of Frobenius splittings has made a significant impact in the study of the geometry of flag varieties and representation theory. This work, unique in book literature, systematically develops the theory and covers all its major developments.
Key features:
* Concise, efficient exposition unfolds from basic introductory material on Frobenius splittings—definitions, properties and examples—to cutting edge research
* Studies in detail the geometry of Schubert varieties, their syzygies, equivariant embeddings of reductive groups, Hilbert Schemes, canonical splittings, good filtrations, among other topics
* Applies Frobenius splitting methods to algebraic geometry and various problems in representation theory
* Many examples, exercises, and open problems suggested throughout
* Comprehensive bibliography and index
This book will be an excellent resource for mathematicians and graduate students in algebraic geometry and representation theory of algebraic groups.
Content:
Front Matter....Pages i-ix
Frobenius Splitting: General Theory....Pages 1-58
Frobenius Splitting of Schubert Varieties....Pages 59-81
Cohomology and Geometry of Schubert Varieties....Pages 83-107
Canonical Splitting and Good Filtration....Pages 109-152
Cotangent Bundles of Flag Varieties....Pages 153-182
Equivariant Embeddings of Reductive Groups....Pages 183-206
Hilbert Schemes of Points on Surfaces....Pages 207-230
Back Matter....Pages 231-250
....