Book contents
- Frontmatter
- Contents
- Preface
- 1 Basics of Commutative Algebra
- 2 Projective Space and Graded Objects
- 3 Free Resolutions and Regular Sequences
- 4 Gröbner Bases and the Buchberger Algorithm
- 5 Combinatorics, Topology and the Stanley–Reisner Ring
- 6 Functors: Localization, Hom, and Tensor
- 7 Geometry of Points and the Hilbert Function
- 8 Snake Lemma, Derived Functors, Tor and Ext
- 9 Curves, Sheaves, and Cohomology
- 10 Projective Dimension, Cohen–Macaulay Modules, Upper Bound Theorem
- A Abstract Algebra Primer
- B Complex Analysis Primer
- Bibliography
- Index
B - Complex Analysis Primer
Published online by Cambridge University Press: 06 July 2010
Book contents
- Frontmatter
- Contents
- Preface
- 1 Basics of Commutative Algebra
- 2 Projective Space and Graded Objects
- 3 Free Resolutions and Regular Sequences
- 4 Gröbner Bases and the Buchberger Algorithm
- 5 Combinatorics, Topology and the Stanley–Reisner Ring
- 6 Functors: Localization, Hom, and Tensor
- 7 Geometry of Points and the Hilbert Function
- 8 Snake Lemma, Derived Functors, Tor and Ext
- 9 Curves, Sheaves, and Cohomology
- 10 Projective Dimension, Cohen–Macaulay Modules, Upper Bound Theorem
- A Abstract Algebra Primer
- B Complex Analysis Primer
- Bibliography
- Index
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- Computational Algebraic Geometry , pp. 175 - 182Publisher: Cambridge University PressPrint publication year: 2003