Toric Varieties pdf epub mobi txt 电子书 下载 2025
- 数学
- Toric
- 代数几何
- 代数几何7
- algebraic_geometry
- Varieties
- 【教材】
- Math
- 代数几何
- Toric几何
- 多面体组合
- 奇异性
- 分层代数
- 正规空间
- 射影空间
- 消除理论
- 计算代数几何
- 编码理论
具体描述
Toric varieties form a beautiful and accessible part of modern algebraic geometry. This book covers the standard topics in toric geometry; a novel feature is that each of the first nine chapters contains an introductory section on the necessary background material in algebraic geometry. Other topics covered include quotient constructions, vanishing theorems, equivariant cohomology, GIT quotients, the secondary fan, and the minimal model program for toric varieties. The subject lends itself to rich examples reflected in the 134 illustrations included in the text. The book also explores connections with commutative algebra and polyhedral geometry, treating both polytopes and their unbounded cousins, polyhedra. There are appendices on the history of toric varieties and the computational tools available to investigate nontrivial examples in toric geometry.
Readers of this book should be familiar with the material covered in basic graduate courses in algebra and topology, and to a somewhat lesser degree, complex analysis. In addition, the authors assume that the reader has had some previous experience with algebraic geometry at an advanced undergraduate level. The book will be a useful reference for graduate students and researchers who are interested in algebraic geometry, polyhedral geometry, and toric varieties.
作者简介
David A. Cox: Amherst College, MA,
John B. Little: College of the Holy Cross, Worcester, MA,
Henry K. Schenck: University of Illinois at Urbana-Champaign, Urbana, IL
目录信息
Title page 2
Contents 6
Preface 10
Notation 16
Basic theory of toric varieties 26
Affine toric varieties 28
Projective toric varieties 74
Normal toric varieties 118
Divisors on toric varieties 180
Homogeneous coordinates on toric varieties 220
Line bundles on toric varieties 270
Projective toric morphisms 338
The canonical divisor of a toric variety 372
Sheaf cohomology of toric varieties 412
Topics in toric geometry 482
Toric surfaces 484
Toric resolutions and toric singularities 538
The topology of toric varieties 586
Toric Hirzebruch-Riemann-Roch 648
Toric GIT and the secondary fan 702
Geometry of the secondary fan 750
The history of toric varieties 812
Computational methods 822
Spectral sequences 836
Bibliography 842
Index 856
Back Cover 870
· · · · · · (收起)
读后感
考虑一些单项式生成的代数(在k[x_i,x_i^{-1}]里),再做适当粘合得到代数簇,希望在上面推广射影空间的一些好性质(例如Picard群、canonical divisor),便自然引出了toric varieties。 值得关心的原因有很多,比如它们是spherical varieties的一大类例子。它们足够特殊,自然...
评分考虑一些单项式生成的代数(在k[x_i,x_i^{-1}]里),再做适当粘合得到代数簇,希望在上面推广射影空间的一些好性质(例如Picard群、canonical divisor),便自然引出了toric varieties。 值得关心的原因有很多,比如它们是spherical varieties的一大类例子。它们足够特殊,自然...
评分考虑一些单项式生成的代数(在k[x_i,x_i^{-1}]里),再做适当粘合得到代数簇,希望在上面推广射影空间的一些好性质(例如Picard群、canonical divisor),便自然引出了toric varieties。 值得关心的原因有很多,比如它们是spherical varieties的一大类例子。它们足够特殊,自然...
评分考虑一些单项式生成的代数(在k[x_i,x_i^{-1}]里),再做适当粘合得到代数簇,希望在上面推广射影空间的一些好性质(例如Picard群、canonical divisor),便自然引出了toric varieties。 值得关心的原因有很多,比如它们是spherical varieties的一大类例子。它们足够特殊,自然...
评分考虑一些单项式生成的代数(在k[x_i,x_i^{-1}]里),再做适当粘合得到代数簇,希望在上面推广射影空间的一些好性质(例如Picard群、canonical divisor),便自然引出了toric varieties。 值得关心的原因有很多,比如它们是spherical varieties的一大类例子。它们足够特殊,自然...
用户评价
只读了开头,以后的研究可能还需要这本书。
评分只读了开头,以后的研究可能还需要这本书。
评分写论文期间来回的翻,找需要的式子,不敢自称看过。 虽然厚,但是写的非常洗练。有朝一日正经啃代数几何的时候可以回来拿来做testing palyground
评分写论文期间来回的翻,找需要的式子,不敢自称看过。 虽然厚,但是写的非常洗练。有朝一日正经啃代数几何的时候可以回来拿来做testing palyground
评分写论文期间来回的翻,找需要的式子,不敢自称看过。 虽然厚,但是写的非常洗练。有朝一日正经啃代数几何的时候可以回来拿来做testing palyground
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