Atiyah and MacDonald - Introduction to Commutative Algebra



Addison-Wesley Series in Mathematics, 1969

Commutative Algebra

"Commutative algebra is essentially the study of commutative rings. Roughly speaking, it has developed from two sources: (1) algebraic geometry and (2) algebraic number theory.  In (1) the prototype of the rings studied is the ring $$k[x_1, \ldots x_n]$$ of polynomials in several variables over a field k; in (2) it is the ring $$\mathbb{Z}$$ of rational integers.  Of these two the algebro-geometric case is the more far-reaching and, in its modern development by Grothendieck, it embraces much of algebraic number theory.  Commutative algebra is now one of the foundation stones of this new algebraic geometry.  It provides the complete local tools for the subject in much the same way as differential analysis provides the tools for differential geometry."

=Chapter 1 : Rings and Ideals=

Operations on ideals

 * Proposition 1.10: The notation $$\prod \mathfrak{a}_i$$ denotes the product operation of the ring, not a direct product of rings.

Extension and contraction
In general, $$f(f^{-1}(X)) \subseteq X \subseteq f^{-1}(f(X)).$$


 * Proposition 1.17: Note that f is not necessarily surjective.

=Chapter 2: Modules=

=Chapter 3: Rings and Modules of Fractions=

=Chapter 4: Primary Decomposition=

=Chapter 5: Integral Dependence and Valuations=

=Chapter 6: Chain Conditions=

=Chapter 7: Noetherian Rings=

=Chapter 8: Artin Rings=

=Chapter 9: Discrete Valuation Rings and Dedekind Domains=

=Chapter 10: Completions=

=Chapter 11: Dimension Theory=