Commutative algebra

Definitions and major results[edit]

The notion of commutative ring assumes commutativity of the multiplication operation and usually the existence of a multiplicative identity in addition.

The category of commutative rings has

commutative rings as its objects
ring homomorphisms as its morphisms; i.e., functions $ϕ : R \to R^{'}$ such that $ϕ$ is a morphism of abelian groups (with respect to the additive structure of the rings $R$ and $R^{'}$ ), $ϕ (r_{1} r_{2}) = ϕ (r_{1}) ϕ (r_{2})$ for all $r_{1}, r_{2} \in R$ , and $ϕ (1_{R}) = 1_{R^{'}}$ .

Affine Schemes[edit]

The theory of affine schemes was initiated with the definition of the prime spectrum of a ring, the set of all prime ideals of a given ring. For curves defined by polynomial equations over a ring $A$ , the object to consider would be the prime spectrum of a polynomial ring in sufficiently many variables modulo the ideal generated by the polynomials in question. The Zariski topology (together with a structural sheaf of rings) on this set endows a geometric structure for which many illuminating algebro-geometric correspondences manifest themselves. For example, for a noetherian ring $A$ , primary decomposition of an ideal $I$ translates exactly into a decomposition of the closed subset $V (I)$ into irreducible components.

Formally speaking, the assignment of a ring $A$ to its prime spectrum $S p e c (A)$ is functorial, and is in fact an equivalence of categories between the category of commutative rings and affine schemes. It is this mechanism, in addition to a number of correspondence theorems, which allows us to change between the language of algebra and geometry.