Section Of A Sheaf
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mathematics Mathematics is an area of knowledge that includes the topics of numbers, formulas and related structures, shapes and the spaces in which they are contained, and quantities and their changes. These topics are represented in modern mathematics ...
, a sheaf is a tool for systematically tracking data (such as sets, abelian groups, rings) attached to the open sets of a topological space and defined locally with regard to them. For example, for each open set, the data could be the ring of continuous functions defined on that open set. Such data is well behaved in that it can be restricted to smaller open sets, and also the data assigned to an open set is equivalent to all collections of compatible data assigned to collections of smaller open sets covering the original open set (intuitively, every piece of data is the sum of its parts). The field of mathematics that studies sheaves is called sheaf theory. Sheaves are understood conceptually as general and abstract objects. Their correct definition is rather technical. They are specifically defined as sheaves of sets or as sheaves of rings, for example, depending on the type of data assigned to the open sets. There are also maps (or
morphism In mathematics, particularly in category theory, a morphism is a structure-preserving map from one mathematical structure to another one of the same type. The notion of morphism recurs in much of contemporary mathematics. In set theory, morphisms a ...
s) from one sheaf to another; sheaves (of a specific type, such as sheaves of abelian groups) with their
morphism In mathematics, particularly in category theory, a morphism is a structure-preserving map from one mathematical structure to another one of the same type. The notion of morphism recurs in much of contemporary mathematics. In set theory, morphisms a ...
s on a fixed topological space form a category. On the other hand, to each continuous map there is associated both a direct image functor, taking sheaves and their morphisms on the
domain Domain may refer to: Mathematics *Domain of a function, the set of input values for which the (total) function is defined **Domain of definition of a partial function **Natural domain of a partial function **Domain of holomorphy of a function * Do ...
to sheaves and morphisms on the codomain, and an inverse image functor operating in the opposite direction. These functors, and certain variants of them, are essential parts of sheaf theory. Due to their general nature and versatility, sheaves have several applications in topology and especially in algebraic and
differential geometry Differential geometry is a mathematical discipline that studies the geometry of smooth shapes and smooth spaces, otherwise known as smooth manifolds. It uses the techniques of differential calculus, integral calculus, linear algebra and multili ...
. First, geometric structures such as that of a
differentiable manifold In mathematics, a differentiable manifold (also differential manifold) is a type of manifold that is locally similar enough to a vector space to allow one to apply calculus. Any manifold can be described by a collection of charts (atlas). One ma ...
or a
scheme A scheme is a systematic plan for the implementation of a certain idea. Scheme or schemer may refer to: Arts and entertainment * ''The Scheme'' (TV series), a BBC Scotland documentary series * The Scheme (band), an English pop band * ''The Schem ...
can be expressed in terms of a sheaf of rings on the space. In such contexts, several geometric constructions such as vector bundles or divisors are naturally specified in terms of sheaves. Second, sheaves provide the framework for a very general cohomology theory, which encompasses also the "usual" topological cohomology theories such as singular cohomology. Especially in algebraic geometry and the theory of
complex manifold In differential geometry and complex geometry, a complex manifold is a manifold with an atlas of charts to the open unit disc in \mathbb^n, such that the transition maps are holomorphic. The term complex manifold is variously used to mean a com ...
s, sheaf cohomology provides a powerful link between topological and geometric properties of spaces. Sheaves also provide the basis for the theory of ''D''-modules, which provide applications to the theory of differential equations. In addition, generalisations of sheaves to more general settings than topological spaces, such as Grothendieck topology, have provided applications to mathematical logic and to number theory.


Definitions and examples

In many mathematical branches, several structures defined on a topological space X (e.g., a
differentiable manifold In mathematics, a differentiable manifold (also differential manifold) is a type of manifold that is locally similar enough to a vector space to allow one to apply calculus. Any manifold can be described by a collection of charts (atlas). One ma ...
) can be naturally ''localised'' or ''restricted'' to open
subset In mathematics, Set (mathematics), set ''A'' is a subset of a set ''B'' if all Element (mathematics), elements of ''A'' are also elements of ''B''; ''B'' is then a superset of ''A''. It is possible for ''A'' and ''B'' to be equal; if they are ...
s U \subset X: typical examples include continuous real-valued or complex-valued functions, n-times differentiable (real-valued or complex-valued) functions,
bounded Boundedness or bounded may refer to: Economics * Bounded rationality, the idea that human rationality in decision-making is bounded by the available information, the cognitive limitations, and the time available to make the decision * Bounded e ...
real-valued functions, vector fields, and
sections Section, Sectioning or Sectioned may refer to: Arts, entertainment and media * Section (music), a complete, but not independent, musical idea * Section (typography), a subdivision, especially of a chapter, in books and documents ** Section sig ...
of any vector bundle on the space. The ability to restrict data to smaller open subsets gives rise to the concept of presheaves. Roughly speaking, sheaves are then those presheaves, where local data can be glued to global data.


Presheaves

Let X be a topological space. A ''presheaf of sets'' F on X consists of the following data: *For each open set U of X, a set F(U). This set is also denoted \Gamma(U, F). The elements in this set are called the ''sections'' of F over U. The sections of F over X are called the ''global sections'' of F. *For each inclusion of open sets V \subseteq U, a function \operatorname_ \colon F(U) \rightarrow F(V). In view of many of the examples below, the morphisms \text_ are called ''restriction morphisms''. If s \in F(U), then its restriction \text_(s) is often denoted s, _V by analogy with restriction of functions. The restriction morphisms are required to satisfy two additional ( functorial) properties: *For every open set U of X, the restriction morphism \operatorname_ \colon F(U) \rightarrow F(U) is the identity morphism on F(U). *If we have three open sets W \subseteq V \subseteq U, then the composite \text_\circ\text_=\text_ Informally, the second axiom says it doesn't matter whether we restrict to ''W'' in one step or restrict first to ''V'', then to ''W''. A concise functorial reformulation of this definition is given further below. Many examples of presheaves come from different classes of functions: to any ''U'', one can assign the set C^0(U) of continuous real-valued functions on ''U''. The restriction maps are then just given by restricting a continuous function on ''U'' to a smaller open subset ''V'', which again is a continuous function. The two presheaf axioms are immediately checked, thereby giving an example of a presheaf. This can be extended to a sheaf of holomorphic functions \mathcal(-) and a sheaf of smooth functions C^\infty(-). Another common class of examples is assigning to U the set of constant real-valued functions on U. This presheaf is called the ''constant presheaf'' associated to \mathbb and is denoted \underline^.


Sheaves

Given a presheaf, a natural question to ask is to what extent its sections over an open set ''U'' are specified by their restrictions to smaller open sets U_i of an open cover \mathcal = \_ of ''U''. A ''sheaf'' is a presheaf that satisfies both of the following two additional axioms: # (''Locality'') Suppose U is an open set, \_ is an open cover of U, and s, t \in F(U) are sections. If s, _ = t, _ for all i \in I, then s = t. # ( ''Gluing'') Suppose U is an open set, \_ is an open cover of U, and \_ is a family of sections. If all pairs of sections agree on the overlap of their domains, that is, if s_i, _ = s_j, _ for all i, j \in I, then there exists a section s \in F(U) such that s, _ = s_i for all i \in I. The section ''s'' whose existence is guaranteed by axiom 2 is called the ''gluing'', ''concatenation'', or ''collation'' of the sections ''s''''i''. By axiom 1 it is unique. Sections ''s_i'' and ''s_j'' satisfying the agreement precondition of axiom 2 are often called ''compatible''; thus axioms 1 and 2 together state that ''any collection of pairwise compatible sections can be uniquely glued together''. A ''separated presheaf'', or ''monopresheaf'', is a presheaf satisfying axiom 1. The presheaf consisting of continuous functions mentioned above is a sheaf. This assertion reduces to checking that, given continuous functions f_i : U_i \to \R which agree on the intersections U_i \cap U_j, there is a unique continuous function f: U \to \R whose restriction equals the f_i. By contrast, the constant presheaf is usually ''not'' a sheaf as it fails to satisfy the locality axiom on the empty set (this is explained in more detail at
constant sheaf Constant or The Constant may refer to: Mathematics * Constant (mathematics), a non-varying value * Mathematical constant, a special number that arises naturally in mathematics, such as or Other concepts * Control variable or scientific con ...
). Presheaves and sheaves are typically denoted by capital letters, F being particularly common, presumably for the
French French (french: français(e), link=no) may refer to: * Something of, from, or related to France ** French language, which originated in France, and its various dialects and accents ** French people, a nation and ethnic group identified with Franc ...
word for sheaf, ''faisceau''. Use of calligraphic letters such as \mathcal is also common. It can be shown that to specify a sheaf, it is enough to specify its restriction to the open sets of a basis for the topology of the underlying space. Moreover, it can also be shown that it is enough to verify the sheaf axioms above relative to the open sets of a covering. This observation is used to construct another example which is crucial in algebraic geometry, namely
quasi-coherent sheaves In mathematics, especially in algebraic geometry and the theory of complex manifolds, coherent sheaves are a class of sheaves closely linked to the geometric properties of the underlying space. The definition of coherent sheaves is made with refer ...
. Here the topological space in question is the spectrum of a commutative ring R, whose points are the
prime ideal In algebra, a prime ideal is a subset of a ring that shares many important properties of a prime number in the ring of integers. The prime ideals for the integers are the sets that contain all the multiples of a given prime number, together with ...
s p in R. The open sets D_f := \ form a basis for the Zariski topology on this space. Given an R-module M, there is a sheaf, denoted by \tilde M on the Spec R, that satisfies :\tilde M(D_f) := M /f the localization of M at f.


Further examples


Sheaf of sections of a continuous map

Any continuous map f:Y\to X of topological spaces determines a sheaf \Gamma(Y/X) on X by setting :\Gamma(Y/X)(U) = \. Any such s is commonly called a section of ''f'', and this example is the reason why the elements in F(U) are generally called sections. This construction is especially important when f is the projection of a
fiber bundle In mathematics, and particularly topology, a fiber bundle (or, in Commonwealth English: fibre bundle) is a space that is a product space, but may have a different topological structure. Specifically, the similarity between a space E and a p ...
onto its base space. For example, the sheaves of smooth functions are the sheaves of sections of the trivial bundle. Another example: the sheaf of sections of :\C \stackrel \to \C\setminus \ is the sheaf which assigns to any ''U'' the set of branches of the
complex logarithm In mathematics Mathematics is an area of knowledge that includes the topics of numbers, formulas and related structures, shapes and the spaces in which they are contained, and quantities and their changes. These topics are represented in ...
on ''U''. Given a point x and an abelian group S, the skyscraper sheaf S_x is defined as follows: if U is an open set containing x, then S_x(U)=S. If U does not contain x, then S_x(U)=0, the trivial group. The restriction maps are either the identity on S, if both open sets contain x, or the zero map otherwise.


Sheaves on manifolds

On an n-dimensional C^k-manifold M, there are a number of important sheaves, such as the sheaf of j-times continuously differentiable functions \mathcal^j_M (with j \leq k). Its sections on some open U are the C^j-functions U \to \R. For j = k, this sheaf is called the ''structure sheaf'' and is denoted \mathcal_M. The nonzero C^k functions also form a sheaf, denoted \mathcal_X^\times.
Differential form In mathematics, differential forms provide a unified approach to define integrands over curves, surfaces, solids, and higher-dimensional manifolds. The modern notion of differential forms was pioneered by Élie Cartan. It has many applications, ...
s (of degree p) also form a sheaf \Omega^p_M. In all these examples, the restriction morphisms are given by restricting functions or forms. The assignment sending U to the compactly supported functions on U is not a sheaf, since there is, in general, no way to preserve this property by passing to a smaller open subset. Instead, this forms a cosheaf, a
dual Dual or Duals may refer to: Paired/two things * Dual (mathematics), a notion of paired concepts that mirror one another ** Dual (category theory), a formalization of mathematical duality *** see more cases in :Duality theories * Dual (grammatical ...
concept where the restriction maps go in the opposite direction than with sheaves. However, taking the
dual Dual or Duals may refer to: Paired/two things * Dual (mathematics), a notion of paired concepts that mirror one another ** Dual (category theory), a formalization of mathematical duality *** see more cases in :Duality theories * Dual (grammatical ...
of these vector spaces does give a sheaf, the sheaf of distributions.


Presheaves that are not sheaves

In addition to the constant presheaf mentioned above, which is usually not a sheaf, there are further examples of presheaves that are not sheaves: * Let X be the two-point topological space \ with the discrete topology. Define a presheaf F as follows: F(\varnothing) = \,\ F(\) = \R,\ F(\) = \R,\ F(\) = \R\times\R\times\RThe restriction map F(\) \to F(\) is the projection of \R \times\R\times\R onto its first coordinate, and the restriction map F(\) \to F(\) is the projection of \R \times\R\times\R onto its second coordinate. F is a presheaf that is not separated: a global section is determined by three numbers, but the values of that section over \ and \ determine only two of those numbers. So while we can glue any two sections over \ and \, we cannot glue them uniquely. * Let X = \R be the
real line In elementary mathematics, a number line is a picture of a graduated straight line (geometry), line that serves as visual representation of the real numbers. Every point of a number line is assumed to correspond to a real number, and every real ...
, and let F(U) be the set of
bounded Boundedness or bounded may refer to: Economics * Bounded rationality, the idea that human rationality in decision-making is bounded by the available information, the cognitive limitations, and the time available to make the decision * Bounded e ...
continuous functions on U. This is not a sheaf because it is not always possible to glue. For example, let U_i be the set of all x such that , x, . The identity function f(x)=x is bounded on each U_i. Consequently we get a section s_i on U_i. However, these sections do not glue, because the function f is not bounded on the real line. Consequently F is a presheaf, but not a sheaf. In fact, F is separated because it is a sub-presheaf of the sheaf of continuous functions.


Motivating sheaves from complex analytic spaces and algebraic geometry

One of the historical motivations for sheaves have come from studying
complex manifold In differential geometry and complex geometry, a complex manifold is a manifold with an atlas of charts to the open unit disc in \mathbb^n, such that the transition maps are holomorphic. The term complex manifold is variously used to mean a com ...
s,
complex analytic geometry In mathematics, and in particular differential geometry and complex geometry, a complex analytic variety Complex analytic variety (or just variety) is sometimes required to be irreducible and (or) Reduced ring, reduced or complex analytic space i ...
, and scheme theory from
algebraic geometry Algebraic geometry is a branch of mathematics, classically studying zeros of multivariate polynomials. Modern algebraic geometry is based on the use of abstract algebraic techniques, mainly from commutative algebra, for solving geometrical ...
. This is because in all of the previous cases, we consider a topological space X together with a structure sheaf \mathcal giving it the structure of a complex manifold, complex analytic space, or scheme. This perspective of equipping a topological space with a sheaf is essential to the theory of locally ringed spaces (see below).


Technical challenges with complex manifolds

One of the main historical motivations for introducing sheaves was constructing a device which keeps track of
holomorphic function In mathematics, a holomorphic function is a complex-valued function of one or more complex variables that is complex differentiable in a neighbourhood of each point in a domain in complex coordinate space . The existence of a complex derivativ ...
s on
complex manifold In differential geometry and complex geometry, a complex manifold is a manifold with an atlas of charts to the open unit disc in \mathbb^n, such that the transition maps are holomorphic. The term complex manifold is variously used to mean a com ...
s. For example, on a compact complex manifold X (like complex projective space or the
vanishing locus In geometry, a locus (plural: ''loci'') (Latin word for "place", "location") is a set of all points (commonly, a line, a line segment, a curve or a surface), whose location satisfies or is determined by one or more specified conditions.. In ...
of a homogeneous polynomial), the ''only'' holomorphic functions
f:X \to \C
are the constant functions. This means there could exist two compact complex manifolds X,X' which are not isomorphic, but nevertheless their ring of global holomorphic functions, denoted \mathcal(X), \mathcal(X'), are isomorphic. Contrast this with smooth manifolds where every manifold M can be embedded inside some \R^n, hence its ring of smooth functions C^\infty(M) comes from restricting the smooth functions from C^\infty(\R^n). Another complexity when considering the ring of holomorphic functions on a complex manifold X is given a small enough open set U \subset X, the holomorphic functions will be isomorphic to \mathcal(U) \cong \mathcal(\C^n). Sheaves are a direct tool for dealing with this complexity since they make it possible to keep track of the holomorphic structure on the underlying topological space of X on arbitrary open subsets U \subset X. This means as U becomes more complex topologically, the ring \mathcal(U) can be expressed from gluing the \mathcal(U_i). Note that sometimes this sheaf is denoted \mathcal(-) or just \mathcal, or even \mathcal_X when we want to emphasize the space the structure sheaf is associated to.


Tracking submanifolds with sheaves

Another common example of sheaves can be constructed by considering a complex submanifold Y \hookrightarrow X. There is an associated sheaf \mathcal_Y which takes an open subset U \subset X and gives the ring of holomorphic functions on U \cap Y. This kind of formalism was found to be extremely powerful and motivates a lot of
homological algebra Homological algebra is the branch of mathematics that studies homology (mathematics), homology in a general algebraic setting. It is a relatively young discipline, whose origins can be traced to investigations in combinatorial topology (a precurs ...
such as
sheaf cohomology In mathematics, sheaf cohomology is the application of homological algebra to analyze the global sections of a sheaf on a topological space. Broadly speaking, sheaf cohomology describes the obstructions to solving a geometric problem globally when i ...
since an intersection theory can be built using these kinds of sheaves from the Serre intersection formula.


Operations with sheaves


Morphisms

Morphisms of sheaves are, roughly speaking, analogous to functions between them. In contrast to a function between sets, which have no additional structure, morphisms of sheaves are those functions which preserve the structure inherent in the sheaves. This idea is made precise in the following definition. Let F and G be two sheaves on X. A ''
morphism In mathematics, particularly in category theory, a morphism is a structure-preserving map from one mathematical structure to another one of the same type. The notion of morphism recurs in much of contemporary mathematics. In set theory, morphisms a ...
'' \varphi:G\to F consists of a morphism \varphi_U:G(U)\to F(U) for each open set U of X, subject to the condition that this morphism is compatible with restrictions. In other words, for every open subset V of an open set U, the following diagram is commutative. :\begin G(U) & \xrightarrow & F(U)\\ r_\Biggl\downarrow & & \Biggl\downarrow r_\\ G(V) & \xrightarrow[] & F(V) \end For example, taking the derivative gives a morphism of sheaves on \R: \mathcal O^n_ \to \mathcal O^_. Indeed, given an (n-times continuously differentiable) function f : U \to \R (with U in \R open), the restriction (to a smaller open subset V) of its derivative equals the derivative of f, _V. With this notion of morphism, sheaves on a fixed topological space X form a category. The general categorical notions of mono-, epi- and isomorphisms can therefore be applied to sheaves. A sheaf morphism \varphi is an isomorphism (resp. monomorphism) if and only if each \varphi_U is a bijection (resp. injective map). Moreover, a morphism of sheaves \varphi is an isomorphism if and only if there exists an open cover \ such that \varphi, _ are isomorphisms of sheaves for all \alpha. This statement, which also holds for monomorphisms, but does not hold for presheaves, is another instance of the idea that sheaves are of a local nature. The corresponding statements do not hold for epimorphisms (of sheaves), and their failure is measured by
sheaf cohomology In mathematics, sheaf cohomology is the application of homological algebra to analyze the global sections of a sheaf on a topological space. Broadly speaking, sheaf cohomology describes the obstructions to solving a geometric problem globally when i ...
.


Stalks of a sheaf

The ''stalk'' \mathcal_x of a sheaf \mathcal captures the properties of a sheaf "around" a point x\in X, generalizing the germs of functions. Here, "around" means that, conceptually speaking, one looks at smaller and smaller neighborhoods of the point. Of course, no single neighborhood will be small enough, which requires considering a limit of some sort. More precisely, the stalk is defined by :\mathcal_x = \varinjlim_ \mathcal(U), the
direct limit In mathematics, a direct limit is a way to construct a (typically large) object from many (typically smaller) objects that are put together in a specific way. These objects may be groups, rings, vector spaces or in general objects from any categor ...
being over all open subsets of X containing the given point x. In other words, an element of the stalk is given by a section over some open neighborhood of x, and two such sections are considered equivalent if their restrictions agree on a smaller neighborhood. The natural morphism F(U)\to F_x takes a section x in F(U) to its ''germ'' at x. This generalises the usual definition of a germ. In many situations, knowing the stalks of a sheaf is enough to control the sheaf itself. For example, whether or not a morphism of sheaves is a monomorphism, epimorphism, or isomorphism can be tested on the stalks. In this sense, a sheaf is determined by its stalks, which are a local data. By contrast, the ''global'' information present in a sheaf, i.e., the ''global sections'', i.e., the sections \mathcal F(X) on the whole space X, typically carry less information. For example, for a compact complex manifold X, the global sections of the sheaf of holomorphic functions are just \C, since any holomorphic function :X \to \C is constant by Liouville's theorem.


Turning a presheaf into a sheaf

It is frequently useful to take the data contained in a presheaf and to express it as a sheaf. It turns out that there is a best possible way to do this. It takes a presheaf F and produces a new sheaf aF called the ''sheafification'' or ''sheaf associated to the presheaf'' F. For example, the sheafification of the constant presheaf (see above) is called the ''
constant sheaf Constant or The Constant may refer to: Mathematics * Constant (mathematics), a non-varying value * Mathematical constant, a special number that arises naturally in mathematics, such as or Other concepts * Control variable or scientific con ...
''. Despite its name, its sections are ''locally'' constant functions. The sheaf aF can be constructed using the
étalé space In mathematics, a sheaf is a tool for systematically tracking data (such as sets, abelian groups, rings) attached to the open sets of a topological space and defined locally with regard to them. For example, for each open set, the data could ...
of F, namely as the sheaf of sections of the map :\mathrm(F) \to X. Another construction of the sheaf aF proceeds by means of a functor L from presheaves to presheaves that gradually improves the properties of a presheaf: for any presheaf F, LF is a separated presheaf, and for any separated presheaf F, LF is a sheaf. The associated sheaf aF is given by LLF. The idea that the sheaf aF is the best possible approximation to F by a sheaf is made precise using the following universal property: there is a natural morphism of presheaves i\colon F\to aF so that for any sheaf G and any morphism of presheaves f\colon F\to G, there is a unique morphism of sheaves \tilde f \colon aF \rightarrow G such that f = \tilde f i. In fact a is the left adjoint functor to the inclusion functor (or forgetful functor) from the category of sheaves to the category of presheaves, and i is the unit of the adjunction. In this way, the category of sheaves turns into a Giraud subcategory of presheaves. This categorical situation is the reason why the sheafification functor appears in constructing cokernels of sheaf morphisms or tensor products of sheaves, but not for kernels, say.


Subsheaves, quotient sheaves

If K is a subsheaf of a sheaf F of abelian groups, then the quotient sheaf Q is the sheaf associated to the presheaf U \mapsto F(U)/K(U); in other words, the quotient sheaf fits into an exact sequence of sheaves of abelian groups; :0 \to K \to F \to Q \to 0. (this is also called a sheaf extension.) Let F,G be sheaves of abelian groups. The set \operatorname(F, G) of morphisms of sheaves from F to G forms an abelian group (by the abelian group structure of G). The sheaf hom of F and G, denoted by, :\mathcal(F, G) is the sheaf of abelian groups U \mapsto \operatorname(F, _U, G, _U) where F, _U is the sheaf on U given by (F, _U)(V) = F(V) (note sheafification is not needed here). The direct sum of F and G is the sheaf given by U \mapsto F(U) \oplus G(U) , and the tensor product of F and G is the sheaf associated to the presheaf U \mapsto F(U) \otimes G(U). All of these operations extend to sheaves of modules over a
sheaf of rings In mathematics, a ringed space is a family of (commutative) rings parametrized by open subsets of a topological space together with ring homomorphisms that play roles of restrictions. Precisely, it is a topological space equipped with a sheaf of ...
A; the above is the special case when A is the
constant sheaf Constant or The Constant may refer to: Mathematics * Constant (mathematics), a non-varying value * Mathematical constant, a special number that arises naturally in mathematics, such as or Other concepts * Control variable or scientific con ...
\underline.


Basic functoriality

Since the data of a (pre-)sheaf depends on the open subsets of the base space, sheaves on different topological spaces are unrelated to each other in the sense that there are no morphisms between them. However, given a continuous map f:X\to Y between two topological spaces, pushforward and pullback relate sheaves on X to those on Y and vice versa.


Direct image

The pushforward (also known as direct image) of a sheaf \mathcal on X is the sheaf defined by :(f_* \mathcal F)(V) = \mathcal F(f^(V)). Here V is an open subset of Y, so that its preimage is open in X by the continuity of f. This construction recovers the skyscraper sheaf S_x mentioned above: :S_x = i_* (S) where i: \ \to X is the inclusion, and S is regarded as a sheaf on the singleton (by S(\)=S, S(\emptyset) = \emptyset. For a map between locally compact spaces, the direct image with compact support is a subsheaf of the direct image. By definition, (f_! \mathcal F)(V) consists of those f \in \mathcal F(f^(V)) whose
support Support may refer to: Arts, entertainment, and media * Supporting character Business and finance * Support (technical analysis) * Child support * Customer support * Income Support Construction * Support (structure), or lateral support, a ...
is proper map over V. If f is proper itself, then f_! \mathcal F = f_* \mathcal F, but in general they disagree.


Inverse image

The pullback or inverse image goes the other way: it produces a sheaf on X, denoted f^ \mathcal G out of a sheaf \mathcal G on Y. If f is the inclusion of an open subset, then the inverse image is just a restriction, i.e., it is given by (f^ \mathcal G)(U) = \mathcal G(U) for an open U in X. A sheaf F (on some space X) is called locally constant if X= \bigcup_ U_i by some open subsets U_i such that the restriction of F to all these open subsets is constant. One a wide range of topological spaces X, such sheaves are equivalent to representations of the
fundamental group In the mathematical field of algebraic topology, the fundamental group of a topological space is the group of the equivalence classes under homotopy of the loops contained in the space. It records information about the basic shape, or holes, of ...
\pi_1(X). For general maps f, the definition of f^ \mathcal G is more involved; it is detailed at inverse image functor. The stalk is an essential special case of the pullback in view of a natural identification, where i is as above: :\mathcal G_x = i^\mathcal(\). More generally, stalks satisfy (f^ \mathcal G)_x = \mathcal G_.


Extension by zero

For the inclusion j : U \to X of an open subset, the extension by zero of a sheaf of abelian groups on U is defined as :(j_! \mathcal F)(V) = \mathcal F(V) if V \subset U and (j_! \mathcal F)(V) = 0 otherwise. For a sheaf \mathcal G on X, this construction is in a sense complementary to i_*, where i is the inclusion of the complement of U: :(j_! j^* \mathcal G)_x = \mathcal G_x for x in U, and the stalk is zero otherwise, while :(i_* i^* \mathcal G)_x = 0 for x in U, and equals \mathcal G_x otherwise. These functors are therefore useful in reducing sheaf-theoretic questions on X to ones on the strata of a stratification, i.e., a decomposition of X into smaller, locally closed subsets.


Complements


Sheaves in more general categories

In addition to (pre-)sheaves as introduced above, where \mathcal F(U) is merely a set, it is in many cases important to keep track of additional structure on these sections. For example, the sections of the sheaf of continuous functions naturally form a real vector space, and restriction is a linear map between these vector spaces. Presheaves with values in an arbitrary category C are defined by first considering the category of open sets on X to be the
posetal category In mathematics, specifically category theory, a posetal category, or thin category, is a category whose homsets each contain at most one morphism. As such, a posetal category amounts to a preordered class (or a preordered set, if its objects for ...
O(X) whose objects are the open sets of X and whose morphisms are inclusions. Then a C-valued presheaf on X is the same as a contravariant functor from O(X) to C. Morphisms in this category of functors, also known as natural transformations, are the same as the morphisms defined above, as can be seen by unraveling the definitions. If the target category C admits all limits, a C-valued presheaf is a sheaf if the following diagram is an equalizer for every open cover \mathcal = \_ of any open set ''U'': :F(U) \rightarrow \prod_ F(U_i) \prod_ F(U_i \cap U_j). Here the first map is the product of the restriction maps :\operatorname_ \colon F(U) \rightarrow F(U_i) and the pair of arrows the products of the two sets of restrictions :\operatorname_ \colon F(U_i) \rightarrow F(U_i \cap U_j) and :\operatorname_ \colon F(U_j) \rightarrow F(U_i \cap U_j). If C is an abelian category, this condition can also be rephrased by requiring that there is an exact sequence :0 \to F(U) \to \prod_i F(U_i) \xrightarrow \prod_ F(U_i \cap U_j). A particular case of this sheaf condition occurs for U being the empty set, and the index set I also being empty. In this case, the sheaf condition requires \mathcal F(\emptyset) to be the terminal object in C.


Ringed spaces and sheaves of modules

In several geometrical disciplines, including
algebraic geometry Algebraic geometry is a branch of mathematics, classically studying zeros of multivariate polynomials. Modern algebraic geometry is based on the use of abstract algebraic techniques, mainly from commutative algebra, for solving geometrical ...
and
differential geometry Differential geometry is a mathematical discipline that studies the geometry of smooth shapes and smooth spaces, otherwise known as smooth manifolds. It uses the techniques of differential calculus, integral calculus, linear algebra and multili ...
, the spaces come along with a natural sheaf of rings, often called the structure sheaf and denoted by \mathcal_X. Such a pair (X, \mathcal O_X) is called a '' ringed space''. Many types of spaces can be defined as certain types of ringed spaces. Commonly, all the stalks \mathcal O_ of the structure sheaf are local rings, in which case the pair is called a ''locally ringed space''. For example, an n-dimensional C^k manifold M is a locally ringed space whose structure sheaf consists of C^k-functions on the open subsets of M. The property of being a ''locally'' ringed space translates into the fact that such a function, which is nonzero at a point x, is also non-zero on a sufficiently small open neighborhood of x. Some authors actually ''define'' real (or complex) manifolds to be locally ringed spaces that are locally isomorphic to the pair consisting of an open subset of \R^n (resp. \C^n) together with the sheaf of C^k (resp. holomorphic) functions. Similarly,
scheme A scheme is a systematic plan for the implementation of a certain idea. Scheme or schemer may refer to: Arts and entertainment * ''The Scheme'' (TV series), a BBC Scotland documentary series * The Scheme (band), an English pop band * ''The Schem ...
s, the foundational notion of spaces in algebraic geometry, are locally ringed spaces that are locally isomorphic to the
spectrum of a ring In commutative algebra, the prime spectrum (or simply the spectrum) of a ring ''R'' is the set of all prime ideals of ''R'', and is usually denoted by \operatorname; in algebraic geometry it is simultaneously a topological space equipped with the ...
. Given a ringed space, a ''sheaf of modules'' is a sheaf \mathcal such that on every open set U of X, \mathcal(U) is an \mathcal_X(U)-module and for every inclusion of open sets V\subseteq U, the restriction map \mathcal(U) \to \mathcal(V) is compatible with the restriction map \mathcal(U) \to \mathcal(V): the restriction of ''fs'' is the restriction of f times that of s for any f in \mathcal(U) and s in \mathcal(U). Most important geometric objects are sheaves of modules. For example, there is a one-to-one correspondence between vector bundles and locally free sheaves of \mathcal_X-modules. This paradigm applies to real vector bundles, complex vector bundles, or vector bundles in algebraic geometry (where \mathcal O consists of smooth functions, holomorphic functions, or regular functions, respectively). Sheaves of solutions to differential equations are D-modules, that is, modules over the sheaf of
differential operator In mathematics, a differential operator is an operator defined as a function of the differentiation operator. It is helpful, as a matter of notation first, to consider differentiation as an abstract operation that accepts a function and return ...
s. On any topological space, modules over the constant sheaf \underline are the same as sheaves of abelian groups in the sense above. There is a different inverse image functor for sheaves of modules over sheaves of rings. This functor is usually denoted f^* and it is distinct from f^. See inverse image functor.


Finiteness conditions for sheaves of modules

Finiteness conditions for module over
commutative ring In mathematics, a commutative ring is a ring in which the multiplication operation is commutative. The study of commutative rings is called commutative algebra. Complementarily, noncommutative algebra is the study of ring properties that are not sp ...
s give rise to similar finiteness conditions for sheaves of modules: \mathcal is called ''finitely generated'' (resp. ''finitely presented'') if, for every point x of X, there exists an open neighborhood U of x, a natural number n (possibly depending on U), and a surjective morphism of sheaves \mathcal_X^n, _U \to \mathcal, _U (respectively, in addition a natural number m, and an exact sequence \mathcal_X^m, _U \to \mathcal_X^n, _U \to \mathcal, _U \to 0.) Paralleling the notion of a coherent module, \mathcal is called a '' coherent sheaf'' if it is of finite type and if, for every open set U and every morphism of sheaves \phi : \mathcal_X^n \to \mathcal (not necessarily surjective), the kernel of \phi is of finite type. \mathcal_X is ''coherent'' if it is coherent as a module over itself. Like for modules, coherence is in general a strictly stronger condition than finite presentation. The Oka coherence theorem states that the sheaf of holomorphic functions on a
complex manifold In differential geometry and complex geometry, a complex manifold is a manifold with an atlas of charts to the open unit disc in \mathbb^n, such that the transition maps are holomorphic. The term complex manifold is variously used to mean a com ...
is coherent.


The étalé space of a sheaf

In the examples above it was noted that some sheaves occur naturally as sheaves of sections. In fact, all sheaves of sets can be represented as sheaves of sections of a topological space called the ''étalé space'', from the French word étalé , meaning roughly "spread out". If F \in \text(X) is a sheaf over X, then the étalé space of F is a topological space E together with a local homeomorphism \pi: E \to X such that the sheaf of sections \Gamma(\pi, -) of \pi is F. The space ''E'' is usually very strange, and even if the sheaf ''F'' arises from a natural topological situation, ''E'' may not have any clear topological interpretation. For example, if ''F'' is the sheaf of sections of a continuous function f: Y \to X, then E=Y if and only if f is a local homeomorphism. The étalé space ''E'' is constructed from the stalks of ''F'' over ''X''. As a set, it is their disjoint union and ''\pi'' is the obvious map that takes the value x on the stalk of F over x \in X. The topology of ''E'' is defined as follows. For each element s \in F(U) and each x \in U, we get a germ of s at x, denoted x or s_x. These germs determine points of ''E''. For any U and s \in F(U), the union of these points (for all x \in U) is declared to be open in ''E''. Notice that each stalk has the discrete topology as subspace topology. Two morphisms between sheaves determine a continuous map of the corresponding étalé spaces that is compatible with the projection maps (in the sense that every germ is mapped to a germ over the same point). This makes the construction into a functor. The construction above determines an equivalence of categories between the category of sheaves of sets on ''X'' and the category of étalé spaces over ''X''. The construction of an étalé space can also be applied to a presheaf, in which case the sheaf of sections of the étalé space recovers the sheaf associated to the given presheaf. This construction makes all sheaves into representable functors on certain categories of topological spaces. As above, let ''F'' be a sheaf on ''X'', let ''E'' be its étalé space, and let \pi:E \to X be the natural projection. Consider the
overcategory In mathematics, specifically category theory, an overcategory (and undercategory) is a distinguished class of categories used in multiple contexts, such as with covering spaces (espace etale). They were introduced as a mechanism for keeping track ...
\text/X of topological spaces over X, that is, the category of topological spaces together with fixed continuous maps to X. Every object of this category is a continuous map f:Y\to X, and a morphism from Y\to X to Z\to X is a continuous map Y\to Z that commutes with the two maps to X. There is a functor
\Gamma:\text/X \to \text
sending an object f:Y\to X to f^ F(Y). For example, if i: U \hookrightarrow X is the inclusion of an open subset, then
\Gamma(i) = f^ F(U) = F(U) = \Gamma(F, U)
and for the inclusion of a point i : \\hookrightarrow X, then
\Gamma(i) = f^ F(\) = F, _x
is the stalk of F at x. There is a natural isomorphism
(f^F)(Y) \cong \operatorname_(f, \pi),
which shows that \pi: E \to X (for the étalé space) represents the functor \Gamma. ''E'' is constructed so that the projection map ''\pi'' is a covering map. In algebraic geometry, the natural analog of a covering map is called an étale morphism. Despite its similarity to "étalé", the word étale has a different meaning in French. It is possible to turn E into a
scheme A scheme is a systematic plan for the implementation of a certain idea. Scheme or schemer may refer to: Arts and entertainment * ''The Scheme'' (TV series), a BBC Scotland documentary series * The Scheme (band), an English pop band * ''The Schem ...
and ''\pi'' into a morphism of schemes in such a way that ''\pi'' retains the same universal property, but ''\pi'' is ''not'' in general an étale morphism because it is not quasi-finite. It is, however, formally étale. The definition of sheaves by étalé spaces is older than the definition given earlier in the article. It is still common in some areas of mathematics such as mathematical analysis.


Sheaf cohomology

In contexts, where the open set U is fixed, and the sheaf is regarded as a variable, the set F(U) is also often denoted \Gamma(U, F). As was noted above, this functor does not preserve epimorphisms. Instead, an epimorphism of sheaves \mathcal F \to \mathcal G is a map with the following property: for any section g \in \mathcal G(U) there is a covering \mathcal = \_ where
U = \bigcup_ U_i
of open subsets, such that the restriction g, _ are in the image of \mathcal F(U_i). However, g itself need not be in the image of \mathcal F(U). A concrete example of this phenomenon is the exponential map :\mathcal O \stackrel \to \mathcal O^\times between the sheaf of
holomorphic function In mathematics, a holomorphic function is a complex-valued function of one or more complex variables that is complex differentiable in a neighbourhood of each point in a domain in complex coordinate space . The existence of a complex derivativ ...
s and non-zero holomorphic functions. This map is an epimorphism, which amounts to saying that any non-zero holomorphic function g (on some open subset in \C, say), admits a
complex logarithm In mathematics Mathematics is an area of knowledge that includes the topics of numbers, formulas and related structures, shapes and the spaces in which they are contained, and quantities and their changes. These topics are represented in ...
''locally'', i.e., after restricting g to appropriate open subsets. However, g need not have a logarithm globally. Sheaf cohomology captures this phenomenon. More precisely, for an exact sequence of sheaves of abelian groups :0 \to \mathcal F_1 \to \mathcal F_2 \to \mathcal F_3 \to 0, (i.e., an epimorphism \mathcal F_2 \to \mathcal F_3 whose kernel is \mathcal F_1), there is a long exact sequence0 \to \Gamma(U, \mathcal F_1) \to \Gamma(U, \mathcal F_2) \to \Gamma(U, \mathcal F_3) \to H^1(U, \mathcal F_1) \to H^1(U, \mathcal F_2) \to H^1(U, \mathcal F_3) \to H^2(U, \mathcal F_1) \to \dotsBy means of this sequence, the first cohomology group H^1(U, \mathcal F_1) is a measure for the non-surjectivity of the map between sections of \mathcal F_2 and \mathcal F_3. There are several different ways of constructing sheaf cohomology. introduced them by defining sheaf cohomology as the derived functor of \Gamma. This method is theoretically satisfactory, but, being based on injective resolutions, of little use in concrete computations.
Godement resolution The Godement resolution of a sheaf (mathematics), sheaf is a construction in homological algebra that allows one to view global, cohomological information about the sheaf in terms of local information coming from its stalks. It is useful for comput ...
s are another general, but practically inaccessible approach.


Computing sheaf cohomology

Especially in the context of sheaves on manifolds, sheaf cohomology can often be computed using resolutions by soft sheaves, fine sheaves, and flabby sheaves (also known as ''flasque sheaves'' from the French ''flasque'' meaning flabby). For example, a partition of unity argument shows that the sheaf of smooth functions on a manifold is soft. The higher cohomology groups H^i(U, \mathcal F) for i > 0 vanish for soft sheaves, which gives a way of computing cohomology of other sheaves. For example, the de Rham complex is a resolution of the constant sheaf \underline on any smooth manifold, so the sheaf cohomology of \underline is equal to its
de Rham cohomology In mathematics, de Rham cohomology (named after Georges de Rham) is a tool belonging both to algebraic topology and to differential topology, capable of expressing basic topological information about smooth manifolds in a form particularly adapte ...
. A different approach is by ÄŒech cohomology. ÄŒech cohomology was the first cohomology theory developed for sheaves and it is well-suited to concrete calculations, such as computing the
coherent sheaf cohomology In mathematics, especially in algebraic geometry and the theory of complex manifolds, coherent sheaf cohomology is a technique for producing functions with specified properties. Many geometric questions can be formulated as questions about the ex ...
of complex projective space \mathbb^n. It relates sections on open subsets of the space to cohomology classes on the space. In most cases, ÄŒech cohomology computes the same cohomology groups as the derived functor cohomology. However, for some pathological spaces, ÄŒech cohomology will give the correct H^1 but incorrect higher cohomology groups. To get around this,
Jean-Louis Verdier Jean-Louis Verdier (; 2 February 1935 – 25 August 1989) was a French mathematician who worked, under the guidance of his doctoral advisor Alexander Grothendieck, on derived categories and Verdier duality. He was a close collaborator of Grothe ...
developed
hypercover In mathematics, and in particular homotopy theory, a hypercovering (or hypercover) is a simplicial object that generalises the ÄŒech nerve of a cover. For the ÄŒech nerve of an open cover one can show that if the space X is compact and if every in ...
ings. Hypercoverings not only give the correct higher cohomology groups but also allow the open subsets mentioned above to be replaced by certain morphisms from another space. This flexibility is necessary in some applications, such as the construction of Pierre Deligne's mixed Hodge structures. Many other coherent sheaf cohomology groups are found using an embedding i:X \hookrightarrow Y of a space X into a space with known cohomology, such as \mathbb^n, or some weighted projective space. In this way, the known sheaf cohomology groups on these ambient spaces can be related to the sheaves i_*\mathcal, giving H^i(Y,i_*\mathcal) \cong H^i(X,\mathcal). For example, computing the coherent sheaf cohomology of projective plane curves is easily found. One big theorem in this space is the Hodge decomposition found using a spectral sequence associated to sheaf cohomology groups, proved by Deligne. Essentially, the E_1-page with terms
E_1^ = H^p(X,\Omega^q_X)
the sheaf cohomology of a smooth
projective variety In algebraic geometry, a projective variety over an algebraically closed field ''k'' is a subset of some projective ''n''-space \mathbb^n over ''k'' that is the zero-locus of some finite family of homogeneous polynomials of ''n'' + 1 variables w ...
X, degenerates, meaning E_1 = E_\infty. This gives the canonical Hodge structure on the cohomology groups H^k(X,\mathbb). It was later found these cohomology groups can be easily explicitly computed using Griffiths residues. See Jacobian ideal. These kinds of theorems lead to one of the deepest theorems about the cohomology of algebraic varieties, the decomposition theorem, paving the path for Mixed Hodge modules. Another clean approach to the computation of some cohomology groups is the Borel–Bott–Weil theorem, which identifies the cohomology groups of some
line bundle In mathematics, a line bundle expresses the concept of a line that varies from point to point of a space. For example, a curve in the plane having a tangent line at each point determines a varying line: the ''tangent bundle'' is a way of organisin ...
s on flag manifolds with
irreducible representation In mathematics, specifically in the representation theory of groups and algebras, an irreducible representation (\rho, V) or irrep of an algebraic structure A is a nonzero representation that has no proper nontrivial subrepresentation (\rho, _W,W ...
s of
Lie group In mathematics, a Lie group (pronounced ) is a group that is also a differentiable manifold. A manifold is a space that locally resembles Euclidean space, whereas groups define the abstract concept of a binary operation along with the additio ...
s. This theorem can be used, for example, to easily compute the cohomology groups of all line bundles on projective space and
grassmann manifold In mathematics, the Grassmannian is a space that parameterizes all - dimensional linear subspaces of the -dimensional vector space . For example, the Grassmannian is the space of lines through the origin in , so it is the same as the project ...
s. In many cases there is a duality theory for sheaves that generalizes Poincaré duality. See Grothendieck duality and Verdier duality.


Derived categories of sheaves

The derived category of the category of sheaves of, say, abelian groups on some space ''X'', denoted here as D(X), is the conceptual haven for sheaf cohomology, by virtue of the following relation: :H^n(X, \mathcal F) = \operatorname_(\mathbf Z, \mathcal F . The adjunction between f^, which is the left adjoint of f_* (already on the level of sheaves of abelian groups) gives rise to an adjunction :f^ : D(Y) \rightleftarrows D(X) : R f_* (for f: X \to Y), where Rf_* is the derived functor. This latter functor encompasses the notion of sheaf cohomology since H^n(X, \mathcal F) = R^n f_* \mathcal F for f: X \to \. Like f_*, the direct image with compact support f_! can also be derived. By virtue of the following isomorphism R f_! F parametrizes the cohomology with compact support of the
fibers Fiber or fibre (from la, fibra, links=no) is a natural or artificial substance that is significantly longer than it is wide. Fibers are often used in the manufacture of other materials. The strongest engineering materials often incorporate ...
of f: :(R^i f_! F)_y = H^i_c(f^(y), F). This isomorphism is an example of a base change theorem. There is another adjunction :Rf_! : D(X) \rightleftarrows D(Y) : f^!. Unlike all the functors considered above, the twisted (or exceptional) inverse image functor f^! is in general only defined on the level of derived categories, i.e., the functor is not obtained as the derived functor of some functor between abelian categories. If f: X \to \ and ''X'' is a smooth orientable manifold of dimension ''n'', then :f^! \underline \mathbf R \cong \underline \mathbf R This computation, and the compatibility of the functors with duality (see Verdier duality) can be used to obtain a high-brow explanation of Poincaré duality. In the context of quasi-coherent sheaves on schemes, there is a similar duality known as coherent duality. Perverse sheaves are certain objects in D(X), i.e., complexes of sheaves (but not in general sheaves proper). They are an important tool to study the geometry of singularities.


Derived categories of coherent sheaves and the Grothendieck group

Another important application of derived categories of sheaves is with the derived category of coherent sheaves on a scheme X denoted D_(X). This was used by Grothendieck in his development of intersection theory using derived categories and K-theory, that the intersection product of subschemes Y_1, Y_2 is represented in K-theory as
_1cdot _2= mathcal_\otimes_^\mathcal_\in K(\text)
where \mathcal_ are coherent sheaves defined by the \mathcal_X-modules given by their structure sheaves.


Sites and topoi

André Weil André Weil (; ; 6 May 1906 – 6 August 1998) was a French mathematician, known for his foundational work in number theory and algebraic geometry. He was a founding member and the ''de facto'' early leader of the mathematical Bourbaki group. Th ...
's Weil conjectures stated that there was a cohomology theory for algebraic varieties over finite fields that would give an analogue of the
Riemann hypothesis In mathematics, the Riemann hypothesis is the conjecture that the Riemann zeta function has its zeros only at the negative even integers and complex numbers with real part . Many consider it to be the most important unsolved problem in ...
. The cohomology of a complex manifold can be defined as the sheaf cohomology of the locally constant sheaf \underline in the Euclidean topology, which suggests defining a Weil cohomology theory in positive characteristic as the sheaf cohomology of a constant sheaf. But the only classical topology on such a variety is the Zariski topology, and the Zariski topology has very few open sets, so few that the cohomology of any Zariski-constant sheaf on an irreducible variety vanishes (except in degree zero). Alexandre Grothendieck solved this problem by introducing Grothendieck topologies, which axiomatize the notion of ''covering''. Grothendieck's insight was that the definition of a sheaf depends only on the open sets of a topological space, not on the individual points. Once he had axiomatized the notion of covering, open sets could be replaced by other objects. A presheaf takes each one of these objects to data, just as before, and a sheaf is a presheaf that satisfies the gluing axiom with respect to our new notion of covering. This allowed Grothendieck to define étale cohomology and ℓ-adic cohomology, which eventually were used to prove the Weil conjectures. A category with a Grothendieck topology is called a ''site''. A category of sheaves on a site is called a ''topos'' or a ''Grothendieck topos''. The notion of a topos was later abstracted by William Lawvere and Miles Tierney to define an elementary topos, which has connections to mathematical logic.


History

The first origins of sheaf theory are hard to pin down – they may be co-extensive with the idea of analytic continuation. It took about 15 years for a recognisable, free-standing theory of sheaves to emerge from the foundational work on cohomology. * 1936 Eduard Čech introduces the ''
nerve A nerve is an enclosed, cable-like bundle of nerve fibers (called axons) in the peripheral nervous system. A nerve transmits electrical impulses. It is the basic unit of the peripheral nervous system. A nerve provides a common pathway for the e ...
'' construction, for associating a
simplicial complex In mathematics, a simplicial complex is a set composed of points, line segments, triangles, and their ''n''-dimensional counterparts (see illustration). Simplicial complexes should not be confused with the more abstract notion of a simplicial set ...
to an open covering. * 1938 Hassler Whitney gives a 'modern' definition of cohomology, summarizing the work since J. W. Alexander and Kolmogorov first defined '' cochains''. * 1943 Norman Steenrod publishes on homology ''with
local coefficients In mathematics, a local system (or a system of local coefficients) on a topological space ''X'' is a tool from algebraic topology which interpolates between cohomology with coefficients in a fixed abelian group ''A'', and general sheaf cohomolog ...
''. * 1945 Jean Leray publishes work carried out as a prisoner of war, motivated by proving fixed-point theorems for application to PDE theory; it is the start of sheaf theory and
spectral sequence In homological algebra and algebraic topology, a spectral sequence is a means of computing homology groups by taking successive approximations. Spectral sequences are a generalization of exact sequences, and since their introduction by , they hav ...
s. * 1947
Henri Cartan Henri Paul Cartan (; 8 July 1904 – 13 August 2008) was a French mathematician who made substantial contributions to algebraic topology. He was the son of the mathematician Élie Cartan, nephew of mathematician Anna Cartan, oldest brother of co ...
reproves the de Rham theorem by sheaf methods, in correspondence with
André Weil André Weil (; ; 6 May 1906 – 6 August 1998) was a French mathematician, known for his foundational work in number theory and algebraic geometry. He was a founding member and the ''de facto'' early leader of the mathematical Bourbaki group. Th ...
(see De Rham–Weil theorem). Leray gives a sheaf definition in his courses via closed sets (the later ''carapaces''). * 1948 The Cartan seminar writes up sheaf theory for the first time. * 1950 The "second edition" sheaf theory from the Cartan seminar: the sheaf space (''espace étalé'') definition is used, with stalkwise structure. Supports are introduced, and cohomology with supports. Continuous mappings give rise to spectral sequences. At the same time Kiyoshi Oka introduces an idea (adjacent to that) of a sheaf of ideals, in
several complex variables The theory of functions of several complex variables is the branch of mathematics dealing with complex-valued functions. The name of the field dealing with the properties of function of several complex variables is called several complex variable ...
. * 1951 The Cartan seminar proves
theorems A and B In mathematics, Cartan's theorems A and B are two results proved by Henri Cartan around 1951, concerning a coherent sheaf on a Stein manifold . They are significant both as applied to several complex variables, and in the general development of s ...
, based on Oka's work. * 1953 The finiteness theorem for coherent sheaves in the analytic theory is proved by Cartan and Jean-Pierre Serre, as is Serre duality. * 1954 Serre's paper ''
Faisceaux algébriques cohérents This is a list of important publications in mathematics, organized by field. Some reasons why a particular publication might be regarded as important: *Topic creator – A publication that created a new topic *Breakthrough – A public ...
'' (published in 1955) introduces sheaves into
algebraic geometry Algebraic geometry is a branch of mathematics, classically studying zeros of multivariate polynomials. Modern algebraic geometry is based on the use of abstract algebraic techniques, mainly from commutative algebra, for solving geometrical ...
. These ideas are immediately exploited by Friedrich Hirzebruch, who writes a major 1956 book on topological methods. * 1955 Alexander Grothendieck in lectures in Kansas defines abelian category and ''presheaf'', and by using injective resolutions allows direct use of sheaf cohomology on all topological spaces, as derived functors. * 1956 Oscar Zariski's report '' Algebraic sheaf theory'' * 1957 Grothendieck's ''Tohoku'' paper rewrites
homological algebra Homological algebra is the branch of mathematics that studies homology (mathematics), homology in a general algebraic setting. It is a relatively young discipline, whose origins can be traced to investigations in combinatorial topology (a precurs ...
; he proves Grothendieck duality (i.e., Serre duality for possibly singular algebraic varieties). * 1957 onwards: Grothendieck extends sheaf theory in line with the needs of algebraic geometry, introducing: schemes and general sheaves on them, local cohomology, derived categories (with Verdier), and Grothendieck topologies. There emerges also his influential schematic idea of ' six operations' in homological algebra. * 1958 Roger Godement's book on sheaf theory is published. At around this time Mikio Sato proposes his hyperfunctions, which will turn out to have sheaf-theoretic nature. At this point sheaves had become a mainstream part of mathematics, with use by no means restricted to algebraic topology. It was later discovered that the logic in categories of sheaves is intuitionistic logic (this observation is now often referred to as
Kripke–Joyal semantics Kripke semantics (also known as relational semantics or frame semantics, and often confused with possible world semantics) is a formal semantics for non-classical logic systems created in the late 1950s and early 1960s by Saul Kripke and André Jo ...
, but probably should be attributed to a number of authors).


See also

* Coherent sheaf * Gerbe * Stack (mathematics) * Sheaf of spectra * Perverse sheaf * Presheaf of spaces * Constructible sheaf * De Rham's theorem


Notes


References

* (oriented towards conventional topological applications) * * * * (updated edition of a classic using enough sheaf theory to show its power) * * (advanced techniques such as the derived category and vanishing cycles on the most reasonable spaces) * (category theory and toposes emphasised) * * * * * (concise lecture notes) * (pedagogic treatment) * (introductory book with open access) {{Authority control * Topological methods of algebraic geometry Algebraic topology