Convex bodies and algebraic geometry
- Publisher: Springer(Berlin [u.a.]), 1988
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Book Parts
top- INTRODUCTION: Introduction.Access to Book Part
- CHAPTER: Chapter 1. Fans and Toric Varieties.Access to Book Part
- CHAPTER: 1.1 Strongly Convex Rational Polyhedral Cones and Fans.Access to Book Part
- CHAPTER: 1.2 Toric Varieties.Access to Book Part
- CHAPTER: 1.3 Orbit Decomposition, Manifolds with Corners and the Fundamental Group.Access to Book Part
- CHAPTER: 1.4 Nonsingularity and Compactness.Access to Book Part
- CHAPTER: 1.5 Equivariant Holomorphic Maps.Access to Book Part
- CHAPTER: 1.6 Low Dimensional Toric Singularities and Finite Continued Fractions.Access to Book Part
- CHAPTER: 1.7 Birational Geometry of Toric Varities.Access to Book Part
- CHAPTER: Chapter 2. Integral Convex Polytopes and Toric Projective Varieties.Access to Book Part
- CHAPTER: 2.1 Equivariant Line Bundles, Invariant Cartier Divisors.Access to Book Part
- CHAPTER: 2.2 Cohomology of Compact Toric Varities.Access to Book Part
- CHAPTER: 2.3 Equivariant Holomorphic Maps to Projective Spaces.Access to Book Part
- CHAPTER: 2.4 Toric Projective Varieties.Access to Book Part
- CHAPTER: 2.5 Mori's Theory and Toric Projective Varieties.Access to Book Part
- CHAPTER: Chapter 3. Toric Varieties and Holomorphic Differential Forms.Access to Book Part
- CHAPTER: 3.1 Differential Forms with Logarithmic Poles.Access to Book Part
- CHAPTER: 3.2 Ishida's Complexes.Access to Book Part
- CHAPTER: 3.3 Compact Toric Varieties and Holomorphic Differential Forms.Access to Book Part
- CHAPTER: 3.4 Automorphism Groups of Toric Varieites and the Cremona Groups.Access to Book Part
- CHAPTER: Chapter 4. Applications.Access to Book Part
- CHAPTER: 4.1 Periodic Continued Fractions and Two-Dimensional Toric Varieties.Access to Book Part
- CHAPTER: 4.2 Cusp Singularities.Access to Book Part
- CHAPTER: 4.3 Compact Quotients of Toric Varities.Access to Book Part
- CHAPTER: Appendix: Geometry Polydedral Cones.Access to Book Part
- CHAPTER: A.1 Convex Polyhedral Cones.Access to Book Part
- CHAPTER: A.2 Convex Polydedral.Access to Book Part
- CHAPTER: A.3 Support Function.Access to Book Part
- CHAPTER: A.4 The Mixed Volume of compact convex sets.Access to Book Part
- CHAPTER: A.5 Morphology for Convex Polytopes.Access to Book Part
- INDEX OF SUBJECTS: Subject Indey.Access to Book Part
How to cite
topOda, Tadao. Convex bodies and algebraic geometry. Berlin [u.a.]: Springer, 1988. <http://eudml.org/doc/203658>.
@book{Oda1988,
author = {Oda, Tadao},
keywords = {torus embeddings; convex figures in real affine spaces; complex analytic spaces; holomorphic maps; birational geometry; subdivisions of fans; Integral convex polytopes; toric projective varieties; holomorphic differential forms},
language = {eng},
location = {Berlin [u.a.]},
publisher = {Springer},
title = {Convex bodies and algebraic geometry},
url = {http://eudml.org/doc/203658},
year = {1988},
}
TY - BOOK
AU - Oda, Tadao
TI - Convex bodies and algebraic geometry
PY - 1988
CY - Berlin [u.a.]
PB - Springer
LA - eng
KW - torus embeddings; convex figures in real affine spaces; complex analytic spaces; holomorphic maps; birational geometry; subdivisions of fans; Integral convex polytopes; toric projective varieties; holomorphic differential forms
UR - http://eudml.org/doc/203658
ER -
Citations in EuDML Documents
top- David Perkinson, Principal parts of line bundles on toric varieties
- S. Hosono, A. Klemm, S. Theisen, An Extended Lecture on Mirror Symmetry
- A. BiaŁynicki-Birula, J. Święcicka, A recipe for finding open subsets of vector spaces with a good quotient
- Richard Scott, Projective embeddings of toric varieties
- Daniele Mundici, Giovanni Panti, A constructive proof that every 3-generated l-group is ultrasimplicial
- Osamu Fujino, Hiroshi Sato, Yukishige Takano, Hokuto Uehara, Three-dimensional terminal toric flips
- M. Marchisio, V. Perduca, On some properties of explicit toric degenerations
- Maria Isabel, Tavares Camacho, Felipe Cano, Singular foliations of toric type
- Laura Costa, Rosa Miró-Roig, Derived category of toric varieties with small Picard number
- Florin Ambro, The set of toric minimal log discrepancies
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