Flat topologyIn mathematics, the flat topology is a Grothendieck topology used in algebraic geometry. It is used to define the theory of flat cohomology; it also plays a fundamental role in the theory of (faithfully flat descent). The term flat here comes from flat modules. There are several slightly different flat topologies, the most common of which are the fppf topology and the fpqc topology. fppf stands for fidèlement plate de présentation finie, and in this topology, a morphism of affine schemes is a covering morphism if it is faithfully flat and of finite presentation.
Groupe de PicardEn géométrie algébrique, le groupe de Picard est un groupe associé à une variété algébrique ou plus généralement à un schéma. Il est en général isomorphe au groupe des diviseurs de Cartier. Si K est un corps de nombres, le groupe de Picard de l'anneau des entiers de K n'est autre que le groupe des classes de K. Pour les courbes algébriques et les variétés abéliennes, le groupe de Picard (ou plutôt le foncteur de Picard) permet de construire respectivement la jacobienne et la variété abélienne duale.
Fibred categoryFibred categories (or fibered categories) are abstract entities in mathematics used to provide a general framework for descent theory. They formalise the various situations in geometry and algebra in which inverse images (or pull-backs) of objects such as vector bundles can be defined. As an example, for each topological space there is the category of vector bundles on the space, and for every continuous map from a topological space X to another topological space Y is associated the pullback functor taking bundles on Y to bundles on X.
Algebraic spaceIn mathematics, algebraic spaces form a generalization of the schemes of algebraic geometry, introduced by Michael Artin for use in deformation theory. Intuitively, schemes are given by gluing together affine schemes using the Zariski topology, while algebraic spaces are given by gluing together affine schemes using the finer étale topology. Alternatively one can think of schemes as being locally isomorphic to affine schemes in the Zariski topology, while algebraic spaces are locally isomorphic to affine schemes in the étale topology.
Glossary of algebraic geometryThis is a glossary of algebraic geometry. See also glossary of commutative algebra, glossary of classical algebraic geometry, and glossary of ring theory. For the number-theoretic applications, see glossary of arithmetic and Diophantine geometry. For simplicity, a reference to the base scheme is often omitted; i.e., a scheme will be a scheme over some fixed base scheme S and a morphism an S-morphism.
Champ algébriqueIn mathematics, an algebraic stack is a vast generalization of algebraic spaces, or schemes, which are foundational for studying moduli theory. Many moduli spaces are constructed using techniques specific to algebraic stacks, such as Artin's representability theorem, which is used to construct the moduli space of pointed algebraic curves and the moduli stack of elliptic curves. Originally, they were introduced by Grothendieck to keep track of automorphisms on moduli spaces, a technique which allows for treating these moduli spaces as if their underlying schemes or algebraic spaces are smooth.
GerbeIn mathematics, a gerbe (dʒɜrb; ʒɛʁb) is a construct in homological algebra and topology. Gerbes were introduced by Jean Giraud following ideas of Alexandre Grothendieck as a tool for non-commutative cohomology in degree 2. They can be seen as an analogue of fibre bundles where the fibre is the classifying stack of a group. Gerbes provide a convenient, if highly abstract, language for dealing with many types of deformation questions especially in modern algebraic geometry.
OrbifoldEn mathématiques, un orbifold (parfois appelé aussi orbivariété) est une généralisation de la notion de variété contenant de possibles singularités. Ces espaces ont été introduits explicitement pour la première fois par Ichirō Satake en 1956 sous le nom de V-manifolds. Pour passer de la notion de variété (différentiable) à celle d'orbifold, on ajoute comme modèles locaux tous les quotients d'ouverts de par l'action de groupes finis. L'intérêt pour ces objets a été ravivé considérablement à la fin des années 70 par William Thurston en relation avec sa conjecture de géométrisation.
Moduli of algebraic curvesIn algebraic geometry, a moduli space of (algebraic) curves is a geometric space (typically a scheme or an algebraic stack) whose points represent isomorphism classes of algebraic curves. It is thus a special case of a moduli space. Depending on the restrictions applied to the classes of algebraic curves considered, the corresponding moduli problem and the moduli space is different. One also distinguishes between fine and coarse moduli spaces for the same moduli problem.
Descent (mathematics)In mathematics, the idea of descent extends the intuitive idea of 'gluing' in topology. Since the topologists' glue is the use of equivalence relations on topological spaces, the theory starts with some ideas on identification. The case of the construction of vector bundles from data on a disjoint union of topological spaces is a straightforward place to start. Suppose X is a topological space covered by open sets Xi. Let Y be the disjoint union of the Xi, so that there is a natural mapping We think of Y as 'above' X, with the Xi projection 'down' onto X.
