Key features:
* Concise, efficient exposition unfolds from basic introductory material on Frobenius splittingsa "definitions, properties and examplesa "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.
Or split into 4x interest-free payments of 25% on orders over R50
Learn more
Key features:
* Concise, efficient exposition unfolds from basic introductory material on Frobenius splittingsa "definitions, properties and examplesa "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.
Imprint | Birkhauser Boston |
Country of origin | United States |
Series | Progress in Mathematics, 231 |
Release date | December 2004 |
Availability | Expected to ship within 10 - 15 working days |
First published | 2005 |
Authors | Michel Brion, Shrawan Kumar |
Dimensions | 235 x 155 x 15mm (L x W x T) |
Format | Hardcover |
Pages | 250 |
Edition | 2005 ed. |
ISBN-13 | 978-0-8176-4191-7 |
Barcode | 9780817641917 |
Categories | |
LSN | 0-8176-4191-2 |