Math 634 — Spring 2002 Commutative Algebra
| Instructor: | Michael Stillman |
| Time: | MWF 9:05-9:55 |
| Room: | Malott 206 |
Textbooks:
- Atiyah and Macdonald: Introduction to Commutative Algebra
- Eisenbud: Commutative Algebra (recommended)
Math 634 will be a first course in commutative algebra, at the level of Atiyah-Macdonald. Besides the material of this book, we will also cover Groebner bases and some of their applications. Many examples will also be given.
Tentative list of topics:
- Groebner bases and applications
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We will use these throughout the course to construct interesting examples
- Prime ideals and operations on ideals
- Modules, tensor products and operations on modules
- Localizations
- Primary decompositions
- Integral dependence
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This section includes some key theorems in commutative algebra: the going-up and going-down theorems, Hilbert's Nullstellensatz, and Noether's normalization theorem. If time permits, we will also describe an elegant algorithm for computing the integral closure of a ring.
- Chain conditions (Noetherian rings, Artinian rings)
- Primary decomposition for Noetherian rings
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This is the key link between commutative algebra and algebraic geometry
- Rings of dimension zero and one: Artinian rings and discrete valuation rings.
- Completions
- Dimension theory
This is the culmination of what we do. We define dimension several different ways and then show that they are the same. This is a very basic, powerful set of results.
There will be weekly homeworks and probably also a project/presentation.