Full Product Details
Author: Ivan Arzhantsev (Moscow State University) ,
Ulrich Derenthal (Leibniz Universität Hannover) ,
Jürgen Hausen (Eberhard-Karls-Universität Tübingen, Germany) ,
Antonio Laface (Universidad de Concepción, Chile)
Publisher: Cambridge University Press
Imprint: Cambridge University Press
Volume: 144
Dimensions:
Width: 15.80cm
, Height: 3.40cm
, Length: 23.50cm
Weight: 0.850kg
ISBN: 9781107024625
ISBN 10: 1107024625
Pages: 472
Publication Date: 29 August 2014
Audience:
Professional and scholarly
,
Professional & Vocational
Format: Hardback
Publisher's Status: Active
Availability: Manufactured on demand
We will order this item for you from a manufactured on demand supplier.
Reviews
Advance praise: 'An excellent introduction to the subject, featuring a wide selection of topics, careful exposition, and many examples and exercises.' David Cox, University of Massachusetts, Amherst Advance praise: 'This book is a detailed account of virtually every aspect of the general theory of the Cox ring of an algebraic variety. After a thorough introduction it takes the reader on an impressive tour through toric geometry, geometric invariant theory, Mori dream spaces, and universal torsors, culminating with applications to the Manin conjecture on rational points. The many worked examples and exercises make it not just a comprehensive reference, but also an excellent introduction for graduate students.' Alexei Skorobogatov, Imperial College London Advance praise: 'This book provides the first comprehensive treatment of Cox rings. Firstly, its broad and complete exposition of the fundamentals of the general theory will be appreciated by both those who want to learn the subject and specialists seeking an ultimate reference on many subtle aspects of the theory. Secondly, it introduces readers to the most important applications that have developed in the past decade and will define the direction of research in the years to come.' Jaroslaw Wisniewski, Institute of Mathematics, University of Warsaw
Author Information
Ivan Arzhantsev received his doctoral degree in 1998 from Lomonosov Moscow State University and is a professor in its department of higher algebra. His research areas are algebraic geometry, algebraic groups and invariant theory. Ulrich Derenthal received his doctoral degree in 2006 from Universität Göttingen. He is a professor of mathematics at Ludwig-Maximilians-Universität München. His research interests include arithmetic geometry and number theory. Jürgen Hausen received his doctoral degree in 1995 from Universität Konstanz. He is a professor of mathematics at Eberhard-Karls-Universität Tübingen. His field of research is algebraic geometry, in particular algebraic transformation groups, torus actions, geometric invariant theory and combinatorial methods. Antonio Laface received his doctoral degree in 2000 from Università degli Studi di Milano. He is an associate professor of mathematics at Universidad de Concepción. His field of research is algebraic geometry, more precisely linear systems and algebraic surfaces and their Cox rings.
