Topics in Commutative Ring Theory

Name: Topics in Commutative Ring Theory
Brand: Princeton University Press
SKU: 9780691127484
Price: 107.99 EUR
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Product variants

A01=John J. Watkins

Addition

Additive inverse

Algebraic structure

Author_John J. Watkins

Axiom of choice

Category=PBF

Coefficient

Commutative ring

Complex number

Coprime integers

Coset

Dimension

Divisibility rule

Division algorithm

eq_isMigrated=1

eq_isMigrated=2

eq_nobargain

Equivalence class

Equivalence relation

Euclidean domain

Factorization

Fermat's Last Theorem

Field of fractions

Formal power series

Function (mathematics)

Geometry

Hilbert's basis theorem

Homomorphism

Ideal (ring theory)

Identity element

Infimum and supremum

Integer

Integral domain

Krull dimension

Linear combination

Mathematician

Mathematics

Maximal element

Maximal ideal

Natural number

Nilpotent

Noetherian

Noetherian ring

Noncommutative ring

Number theory

Parity (mathematics)

Partially ordered set

Polynomial

Polynomial ring

Power series

Prime ideal

Prime number

Principal ideal

Principal ideal domain

Pure mathematics

Quotient

Quotient ring

Rational number

Real number

Regular element

Ring of integers

Ring theory

Scientific notation

Space-filling curve

Special case

Subring

Subset

Theorem

Topology

Unique factorization domain

Upper and lower bounds

Variable (mathematics)

Zermelo-Fraenkel set theory

Zero element

Zorn's lemma

Product details

ISBN 9780691127484
Weight: 624g
Dimensions: 178 x 254mm
Publication Date: 22 Jul 2007
Publisher: Princeton University Press
Publication City/Country: US
Product Form: Hardback

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Topics in Commutative Ring Theory is a textbook for advanced undergraduate students as well as graduate students and mathematicians seeking an accessible introduction to this fascinating area of abstract algebra. Commutative ring theory arose more than a century ago to address questions in geometry and number theory. A commutative ring is a set-such as the integers, complex numbers, or polynomials with real coefficients--with two operations, addition and multiplication. Starting from this simple definition, John Watkins guides readers from basic concepts to Noetherian rings-one of the most important classes of commutative rings--and beyond to the frontiers of current research in the field. Each chapter includes problems that encourage active reading--routine exercises as well as problems that build technical skills and reinforce new concepts. The final chapter is devoted to new computational techniques now available through computers. Careful to avoid intimidating theorems and proofs whenever possible, Watkins emphasizes the historical roots of the subject, like the role of commutative rings in Fermat's last theorem. He leads readers into unexpected territory with discussions on rings of continuous functions and the set-theoretic foundations of mathematics. Written by an award-winning teacher, this is the first introductory textbook to require no prior knowledge of ring theory to get started. Refreshingly informal without ever sacrificing mathematical rigor, Topics in Commutative Ring Theory is an ideal resource for anyone seeking entry into this stimulating field of study

John J. Watkins is professor of mathematics at Colorado College. He is the author of "Across the Board: The Mathematics of Chessboard Problems" (Princeton) and the coauthor of "Graphs: An Introductory Approach".