Overview
- Covers important topics such as the Hilbert Basis Theorem, the Nullstellensatz, invariant theory, projective geometry, and dimension theory
- Includes a significantly updated section on Maple in Appendix C
- Contains updated information on AXIOM, CoCoA, Macaulay 2, Magma, Mathematica and SINGULAR
- A shorter proof of the Extension Theorem is presented in Section 6 of Chapter 3
- Over 200 pages reflect changes as compared to the 2nd edition to enhance clarity and correctness
- Written at a level appropriate to undergraduates
Part of the book series: Undergraduate Texts in Mathematics (UTM)
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Table of contents (9 chapters)
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Front Matter
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Back Matter
Keywords
About this book
Algebraic Geometry is the study of systems of polynomial equations in one or more variables, asking such questions as: Does the system have finitely many solutions, and if so how can one find them? And if there are infinitely many solutions, how can they be described and manipulated?
The solutions of a system of polynomial equations form a geometric object called a variety; the corresponding algebraic object is an ideal. There is a close relationship between ideals and varieties which reveals the intimate link between algebra and geometry. Written at a level appropriate to undergraduates, this book covers such topics as the Hilbert Basis Theorem, the Nullstellensatz, invariant theory, projective geometry, and dimension theory.
The algorithms to answer questions such as those posed above are an important part of algebraic geometry. Although the algorithmic roots of algebraic geometry are old, it is only in the last forty years that computational methods have regainedtheir earlier prominence. New algorithms, coupled with the power of fast computers, have led to both theoretical advances and interesting applications, for example in robotics and in geometric theorem proving.
In addition to enhancing the text of the second edition, with over 200 pages reflecting changes to enhance clarity and correctness, this third edition of Ideals, Varieties and Algorithms includes: A significantly updated section on Maple in Appendix C; Updated information on AXIOM, CoCoA, Macaulay 2, Magma, Mathematica and SINGULAR; A shorter proof of the Extension Theorem presented in Section 6 of Chapter 3.
From the 2nd edition: "I consider the book to be wonderful. ... The exposition is very clear, there are many helpful pictures, and there are a great many instructive exercises, some quite challenging ... offers the heart and soul of modern commutative and algebraic geometry." The American Mathematical Monthly
Reviews
From the reviews of the third edition:
"The book gives an introduction to Buchberger’s algorithm with applications to syzygies, Hilbert polynomials, primary decompositions. There is an introduction to classical algebraic geometry with applications to the ideal membership problem, solving polynomial equations, and elimination theory. … The book is well-written. … The reviewer is sure that it will be a excellent guide to introduce further undergraduates in the algorithmic aspect of commutative algebra and algebraic geometry." (Peter Schenzel, Zentralblatt MATH, Vol. 1118 (20), 2007)
Authors and Affiliations
Bibliographic Information
Book Title: Ideals, Varieties, and Algorithms
Book Subtitle: An Introduction to Computational Algebraic Geometry and Commutative Algebra
Authors: David Cox, John Little, Donal O’Shea
Series Title: Undergraduate Texts in Mathematics
DOI: https://doi.org/10.1007/978-0-387-35651-8
Publisher: Springer New York, NY
eBook Packages: Mathematics and Statistics, Mathematics and Statistics (R0)
Copyright Information: Springer-Verlag New York 2007
eBook ISBN: 978-0-387-35651-8Published: 28 August 2007
Series ISSN: 0172-6056
Series E-ISSN: 2197-5604
Edition Number: 3
Number of Pages: XV, 553
Topics: Algebraic Geometry, Commutative Rings and Algebras, Mathematical Logic and Foundations, Mathematical Software