List of topologies on the category of schemes information

topologies, each of which is well-suited for a different purpose. This is a list of some of the topologies on the category of schemes. cdh topology A...

The following is a list of named topologies or topological spaces, many of which are counterexamples in topology and related branches of mathematics. This...

Mac Lane in the middle of the 20th century in their foundational work on algebraic topology. Category theory is used in almost all areas of mathematics...

classification scheme does not fit entirely with the MSC, ACM or PACS classification schemes. It is common to see codes from one or more of these schemes on individual...

The following outline is provided as an overview of and guide to category theory, the area of study in mathematics that examines in an abstract way the...

Homotopical algebra; Topology using categories, including algebraic topology, categorical topology, quantum topology, low-dimensional topology; Categorical logic...

scheme is a group object in a category of schemes that has fiber products and some final object S. That is, it is an S-scheme G equipped with one of the...

Lie group topics List of mathematical properties of points List of topology topics List of topologies Topological property List of triangle topics Combinatorics...

using the Yoneda embedding, within the more abstract category of presheaves of sets over the category of affine schemes. The Zariski topology in the set-theoretic...

(who worked on SGA3, on group schemes), Luc Illusie (cotangent complex), Michel Raynaud, Jean-Louis Verdier (co-founder of the derived category theory),...

presheaves of sets over the category of affine schemes. The Zariski topology in the set theoretic sense is then replaced by a Grothendieck topology. Grothendieck...

encompasses the study of denotational semantics of computer algorithms. Note that the Scott topology is quite different than many common topologies one might...

topoi give the foundations for studying schemes purely as functors on the category of algebras. To a scheme and even a stack one may associate an étale...

prototypical example of an abelian category is the category of abelian groups, Ab. Abelian categories are very stable categories; for example they are...

topology on the product is not the product of Zariski topologies on the factors). An algebraic group is said to be connected if the underlying algebraic variety...

Scott topology. The most general setting for apply is in category theory, where it is right adjoint to currying in closed monoidal categories. A special...

themes of algebraic geometry is the duality of the category of affine schemes and the category of commutative rings. The functor G {\displaystyle G} associates...

glossary of category theory, glossary of differential geometry and topology, Timeline of manifolds. Convention: Throughout the article, I denotes the unit interval...

Schnirelmann, developed the Lusternik–Schnirelmann category in topology and Schnirelmann density of numbers Igor Shafarevich, introduced the Shafarevich–Weil...

structure of computers. The study of types of algebraic structures as mathematical objects is the purpose of universal algebra and category theory. The latter...

only on the topology, not on the structure sheaf. See also Global dimension. Examples: equidimensional schemes in dimension 0: Artinian schemes, 1: algebraic...

References Sampling theory Scheme theory the study of schemes introduced by Alexander Grothendieck. It allows the use of sheaf theory to study algebraic...

On the other hand, other foundational descriptions of category theory are considerably stronger, and an identical category-theoretic statement of choice...

formed with tree, line and star topologies, which can be mixed as needed; ring topologies are not supported. A tree topology is recommended for a large installation...

The topology on Xan is called the "complex topology" (and is very different from the subspace topology). Suppose φ: X → Y is a morphism of schemes of...