commutative algebra

Regular sequence, which is an important topic in commutative algebra.

He began his academic career by working in commutative algebra, especially on flat modules.

The even functions form a commutative algebra over the reals.

In commutative algebra, the idealizer is related to a more general construction.

The fact that and so forth is the defining feature of commutative algebra.

This is a very common technique in commutative algebra.

Commutative algebra is the main technical tool in the local study of schemes.

It is a part of commutative algebra and algebraic geometry.

The question of rigour he addressed by recourse to commutative algebra.

Note that unlike most matrix algebras, this is a commutative algebra.

Any textbook on commutative algebra covers this topic, such as:

Much of the modern development of commutative algebra emphasizes modules.

His research interests include commutative algebra and algebraic geometry.

An example of a link between finite generation and integral elements can be found in commutative algebras.

There is also a construction using commutative algebra, which becomes technical for non-regular rings.

In mathematics, the residue field is a basic construction in commutative algebra.

Kleiman is known for his work in algebraic geometry and commutative algebra.

On the contrary, the most natural language in which to study these objects is differential calculus over commutative algebras.

Combinatorial commutative algebra is a relatively new, rapidly developing mathematical discipline.

This allows the development of commutative algebra and algebraic geometry on new foundations.

Hochster's work is primarily in commutative algebra, especially the study of modules over local rings.

In the same period began the algebraization of the algebraic geometry through commutative algebra.

Frequently such generalizations are employed in algebraic geometry and commutative algebra.

This category is one of the central objects of study in the subject of commutative algebra.

A related idea exists in commutative algebra.