Introduction to Commutative Algebra
In this article we are going to delve into the exciting world of Introduction to Commutative Algebra, a topic that has captivated the attention of many people throughout history. From its origins to the present, Introduction to Commutative Algebra has been the subject of study, debate and interest by experts and fans. Along these lines we will explore the different facets of Introduction to Commutative Algebra, its impact on society and the various perspectives that have developed around it. Without a doubt, Introduction to Commutative Algebra is a topic that does not leave anyone indifferent and that deserves to be analyzed in depth.
 First edition | |
| Author | M. F. Atiyah I. G. MacDonald |
|---|---|
| Language | English |
| Series | Addison-Wesley Series in Mathematics |
| Subject | Algebra |
| Genre | Textbook |
| Published | 1969 |
| Publisher | Addison-Wesley Publishing Company |
| Pages | 128 |
Introduction to Commutative Algebra (often informally referred to by the authors' names as "Atiyah and Macdonald") is a well-known commutative algebra textbook written by Michael Atiyah and Ian G. Macdonald.[1] It is on the list of 173 books essential for undergraduate math libraries. [2] As of May 2025, Google Scholar lists over 8000 citations to this book.
It deals with elementary concepts of commutative algebra including localization, primary decomposition, integral dependence, Noetherian and Artinian rings and modules, Dedekind rings, completions and a moderate amount of dimension theory. Having originated as a set of lecture notes for third-year undergraduate students at Oxford University, it is notable for being among the shorter English-language introductory textbooks in the subject, employing a terse style while also relegating a good deal of material (including a brief introduction to prime spectra and scheme theory) to the exercises.
(Hardcover 1969, ISBN 0-201-00361-9) (Paperback 1994, ISBN 0-201-40751-5)
Reviews
Michael Berg says "this classic book, is one of the premier texts for a serious graduate (or very gifted undergraduate) student".[3] Mark Green calls it an "elegant minimalist introduction".[4] W. Jonsson says "An amazing amount of information is included in the 128 pages of this book".[5] D. J. Lewis says "The highlight of the text is the very excellent set of problems which constitute one-third of the text". B. R. McDonald says "The student consensus was that the text was very readable ... we were pleased with the success of the text".[6] On the other hand, Lewis says "The text is very tersely written, examples are a bit scarce and proofs are condensed. This reviewer doubts that many students can profitably read it unassisted."
The book has enthusiastic endorsements from several math professors. Henry Pinkham, former Professor of Math at Columbia University said "probably the best introduction to Commutative Algebra, and has very good exercises."[7] Jonathan Wise, Associate Professor at University of Colorado Boulder says "may be the best math textbook ever written."[8]
References
- ^ Credited as "I. G. MacDonald" on the cover of Introduction to Commutative Algebra, the author usually spelt his name as "Macdonald" in his other works.
- ^ "The Basic Library List: MAA's Recommendations for Undergraduate Libraries". 4 November 2022. Retrieved 24 May 2025.
- ^ Berg, Michael. "Introduction to Commutative Algebra". Mathematical Association of America (MAA). Retrieved 2025-05-23.
- ^ Green, Mark (1996). "Commutative algebra with a view toward algebraic geometry". Bulletin of the American Mathematical Society. 33 (3): 367.
- ^ Jonsson, Wilbur (1970). "Introduction to Commutative algebra". Canadian Mathematical Bulletin. 13: 162.
- ^ Lewis, D.J.; McDonald, B.R. (1970). "Introduction to Commutative Algebra". The American Mathematical Monthly. 77 (7): 783–784.
- ^ "Commutative Algebra for Arithmetic and Algebraic Geometry, Math G4261, Fall 2000, Syllabus". 21 Sep 2000. Retrieved 24 May 2025.
- ^ "Math G4261, Fall 2000, Syllabus". Retrieved 24 May 2025.
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