Logo

Trends in Commutative Algebra

Large book cover: Trends in Commutative Algebra

Trends in Commutative Algebra
by

Publisher: Cambridge University Press
ISBN/ASIN: 0521831954
ISBN-13: 9780521831956
Number of pages: 264

Description:
This book is based on lectures by six internationally known experts presented at the 2002 MSRI introductory workshop on commutative algebra. They focus on the interaction of commutative algebra with other areas of mathematics, including algebraic geometry, group cohomology and representation theory, and combinatorics, with all necessary background provided.

Home page url

Download or read it online for free here:
Download link
(multiple PDF files)

Similar books

Book cover: Commutative AlgebraCommutative Algebra
- Wikibooks
This wikibook is intended to give an introduction to commutative algebra; i.e. it shall comprehensively describe the most important commutative algebraic objects. The axiom of choice will be used, although there is no indication that it is true.
(1839 views)
Book cover: Commutative Algebra and Noncommutative Algebraic GeometryCommutative Algebra and Noncommutative Algebraic Geometry
by - Cambridge University Press
The books cover birational geometry, D-modules, invariant theory, matrix factorizations, noncommutative resolutions, singularity categories, support varieties, tilting theory, etc. These volumes reflect the lively interaction between the subjects.
(1012 views)
Book cover: Introduction to Commutative AlgebraIntroduction to Commutative Algebra
by - University of Maryland
Notes for an introductory course on commutative algebra. Algebraic geometry uses commutative algebraic as its 'local machinery'. The goal of these lectures is to study commutative algebra and some topics in algebraic geometry in a parallel manner.
(5580 views)
Book cover: Lectures on Commutative AlgebraLectures on Commutative Algebra
by - Indian Institute of Technology, Bombay
These lecture notes attempt to give a rapid review of the rudiments of classical commutative algebra. Topics covered: rings and modules, Noetherian rings, integral extensions, Dedekind domains, and primary decomposition of modules.
(4731 views)