MOMENTAN AUSVERKAUFT
Über dieses Produkt
Product Identifiers
PublisherCambridge University Press
ISBN-100521636418
ISBN-139780521636414
eBay Product ID (ePID)1875865
Product Key Features
Number of Pages356 Pages
Publication NameExplicit Birational Geometry of 3-Folds
LanguageEnglish
SubjectTopology, Algebra / General, Geometry / Algebraic
Publication Year2000
TypeTextbook
AuthorJ. W. S. Cassels
Subject AreaMathematics
SeriesLondon Mathematical Society Lecture Note Ser.
FormatTrade Paperback
Dimensions
Item Height0.8 in
Item Weight17.3 Oz
Item Length9.2 in
Item Width6.4 in
Additional Product Features
Intended AudienceScholarly & Professional
LCCN00-708875
Dewey Edition21
Series Volume NumberSeries Number 281
IllustratedYes
Dewey Decimal516.3/5
Table Of ContentForeword; 1. One parameter families containing three dimensional toric Gorenstein singularities K. Altmann; 2. Nonrational covers of CPm × CPn J. Kollár; 3. Essentials of the method of maximal singularities A. V. Pukhlikov; 4. Working with weighted complete intersections A. R. Iano-Fletcher; 5. Fano 3-fold hypersurfaces A. Corti, A. V. Pukhlikov and M. Reid; 6. Singularities of linear systems and 3-fold birational geometry A. Corti; 7. Twenty five years of 3-folds - an old person's view M. Reid.
SynopsisOne of the main achievements of algebraic geometry over the last 30 years is the work of Mori and others extending minimal models and the Enriques-Kodaira classification to 3-folds. This book, first published in 2000, is an integrated suite of papers centred around applications of Mori theory to birational geometry. Four of the papers (those by Pukhlikov, Fletcher, Corti, and the long joint paper Corti, Pukhlikov and Reid) work out in detail the theory of birational rigidity of Fano 3-folds; these contributions work for the first time with a representative class of Fano varieties, 3-fold hypersurfaces in weighted projective space, and include an attractive introductory treatment and a wealth of detailed computation of special cases., This volume, first published in 2000, is an integrated suite of papers centred around applications of Mori theory to birational geometry. It contains articles by K. Altmann, A. V. Pukhlikov, A. R. Iano-Fletcher, A. Corti, and M. Reid., One of the main achievements of algebraic geometry over the past twenty years is the work of Mori and others extending minimal models and the Enriques-Kodaira classification to 3-folds. This integrated suite of papers centers around applications of Mori theory to birational geometry. Four of the papers (those by Pukhlikov, Fletcher, Corti, and the long joint paper by Corti, Pukhlikov and Reid) work out in detail the theory of birational rigidity of Fano 3-folds. These contributions work for the first time with a representative class of Fano varieties, 3-fold hypersurfaces in weighted projective space, and they include an attractive introductory treatment with a wealth of detailed computation of special cases.
LC Classification NumberQA564 .E97 2000
