In mathematics, a topos (UK: /ˈtɒpɒs/, US: /ˈtoʊpoʊs, ˈtoʊpɒs/; plural topoi /ˈtoʊpɔɪ/ or /ˈtɒpɔɪ/, or toposes) is a category that behaves like the category of sheaves of sets on a topological space (or more generally: on a site). Topoi behave much like the category of sets and possess a notion of localization; they are a direct generalization of pointset topology.^{[1]} The Grothendieck topoi find applications in algebraic geometry; the more general elementary topoi are used in logic.
The mathematical field that studies topoi is called topos theory.
YouTube Encyclopedic

1/5Views:7 0976113 3232 507 651690

Motivation for a Definition of a Topos

Topos: 2021 in review

Category Theory For Beginners: Topos Theory Essentials

Who cares about topology? (Inscribed rectangle problem)

Exponentials in a Topos
Transcription
Grothendieck topos (topos in geometry)
Since the introduction of sheaves into mathematics in the 1940s, a major theme has been to study a space by studying sheaves on a space. This idea was expounded by Alexander Grothendieck by introducing the notion of a "topos". The main utility of this notion is in the abundance of situations in mathematics where topological heuristics are very effective, but an honest topological space is lacking; it is sometimes possible to find a topos formalizing the heuristic. An important example of this programmatic idea is the étale topos of a scheme. Another illustration of the capability of Grothendieck toposes to incarnate the “essence” of different mathematical situations is given by their use as bridges for connecting theories which, albeit written in possibly very different languages, share a common mathematical content.^{[2]}^{[3]}
Equivalent definitions
A Grothendieck topos is a category C which satisfies any one of the following three properties. (A theorem of Jean Giraud states that the properties below are all equivalent.)
 There is a small category D and an inclusion C ↪ Presh(D) that admits a finitelimitpreserving left adjoint.
 C is the category of sheaves on a Grothendieck site.
 C satisfies Giraud's axioms, below.
Here Presh(D) denotes the category of contravariant functors from D to the category of sets; such a contravariant functor is frequently called a presheaf.
Giraud's axioms
Giraud's axioms for a category C are:
 C has a small set of generators, and admits all small colimits. Furthermore, fiber products distribute over coproducts. That is, given a set I, an Iindexed coproduct mapping to A, and a morphism A' → A, the pullback is an Iindexed coproduct of the pullbacks:
 Sums in C are disjoint. In other words, the fiber product of X and Y over their sum is the initial object in C.
 All equivalence relations in C are effective.
The last axiom needs the most explanation. If X is an object of C, an "equivalence relation" R on X is a map R → X × X in C such that for any object Y in C, the induced map Hom(Y, R) → Hom(Y, X) × Hom(Y, X) gives an ordinary equivalence relation on the set Hom(Y, X). Since C has colimits we may form the coequalizer of the two maps R → X; call this X/R. The equivalence relation is "effective" if the canonical map
is an isomorphism.
Examples
Giraud's theorem already gives "sheaves on sites" as a complete list of examples. Note, however, that nonequivalent sites often give rise to equivalent topoi. As indicated in the introduction, sheaves on ordinary topological spaces motivate many of the basic definitions and results of topos theory.
Category of sets and Gsets
The category of sets is an important special case: it plays the role of a point in topos theory. Indeed, a set may be thought of as a sheaf on a point since functors on the singleton category with a single object and only the identity morphism are just specific sets in the category of sets.
Similarly, there is a topos for any group which is equivalent to the category of sets. We construct this as the category of presheaves on the category with one object, but now the set of morphisms is given by the group . Since any functor must give a action on the target, this gives the category of sets. Similarly, for a groupoid the category of presheaves on gives a collection of sets indexed by the set of objects in , and the automorphisms of an object in has an action on the target of the functor.
Topoi from ringed spaces
More exotic examples, and the raison d'être of topos theory, come from algebraic geometry. The basic example of a topos comes from the Zariski topos of a scheme. For each scheme there is a site (of objects given by open subsets and morphisms given by inclusions) whose category of presheaves forms the Zarisksi topos . But once distinguished classes of morphisms are considered, there are multiple generalizations of this which leads to nontrivial mathematics. Moreover, 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 topos, an fppf topos, or a Nisnevich topos. Another important example of a topos is from the crystalline site. In the case of the étale topos, these form the foundational objects of study in anabelian geometry, which studies objects in algebraic geometry that are determined entirely by the structure of their étale fundamental group.
Pathologies
Topos theory is, in some sense, a generalization of classical pointset topology. One should therefore expect to see old and new instances of pathological behavior. For instance, there is an example due to Pierre Deligne of a nontrivial topos that has no points (see below for the definition of points of a topos).
Geometric morphisms
If and are topoi, a geometric morphism is a pair of adjoint functors (u^{∗},u_{∗}) (where u^{∗} : Y → X is left adjoint to u_{∗} : X → Y) such that u^{∗} preserves finite limits. Note that u^{∗} automatically preserves colimits by virtue of having a right adjoint.
By Freyd's adjoint functor theorem, to give a geometric morphism X → Y is to give a functor u^{∗}: Y → X that preserves finite limits and all small colimits. Thus geometric morphisms between topoi may be seen as analogues of maps of locales.
If and are topological spaces and is a continuous map between them, then the pullback and pushforward operations on sheaves yield a geometric morphism between the associated topoi for the sites .
Points of topoi
A point of a topos is defined as a geometric morphism from the topos of sets to .
If X is an ordinary space and x is a point of X, then the functor that takes a sheaf F to its stalk F_{x} has a right adjoint (the "skyscraper sheaf" functor), so an ordinary point of X also determines a topostheoretic point. These may be constructed as the pullbackpushforward along the continuous map x: 1 → X.
For the etale topos of a space , a point is a bit more refined of an object. Given a point of the underlying scheme a point of the topos is then given by a separable field extension of such that the associated map factors through the original point . Then, the factorization map
More precisely, those are the global points. They are not adequate in themselves for displaying the spacelike aspect of a topos, because a nontrivial topos may fail to have any. Generalized points are geometric morphisms from a topos Y (the stage of definition) to X. There are enough of these to display the spacelike aspect. For example, if X is the classifying topos S[T] for a geometric theory T, then the universal property says that its points are the models of T (in any stage of definition Y).
Essential geometric morphisms
A geometric morphism (u^{∗},u_{∗}) is essential if u^{∗} has a further left adjoint u_{!}, or equivalently (by the adjoint functor theorem) if u^{∗} preserves not only finite but all small limits.
Ringed topoi
A ringed topos is a pair (X,R), where X is a topos and R is a commutative ring object in X. Most of the constructions of ringed spaces go through for ringed topoi. The category of Rmodule objects in X is an abelian category with enough injectives. A more useful abelian category is the subcategory of quasicoherent Rmodules: these are Rmodules that admit a presentation.
Another important class of ringed topoi, besides ringed spaces, are the étale topoi of Deligne–Mumford stacks.
Homotopy theory of topoi
Michael Artin and Barry Mazur associated to the site underlying a topos a prosimplicial set (up to homotopy).^{[4]} (It's better to consider it in Ho(proSS); see Edwards) Using this inverse system of simplicial sets one may sometimes associate to a homotopy invariant in classical topology an inverse system of invariants in topos theory. The study of the prosimplicial set associated to the étale topos of a scheme is called étale homotopy theory.^{[5]} In good cases (if the scheme is Noetherian and geometrically unibranch), this prosimplicial set is profinite.
Elementary topoi (topoi in logic)
Introduction
Since the early 20th century, the predominant axiomatic foundation of mathematics has been set theory, in which all mathematical objects are ultimately represented by sets (including functions, which map between sets). More recent work in category theory allows this foundation to be generalized using topoi; each topos completely defines its own mathematical framework. The category of sets forms a familiar topos, and working within this topos is equivalent to using traditional settheoretic mathematics. But one could instead choose to work with many alternative topoi. A standard formulation of the axiom of choice makes sense in any topos, and there are topoi in which it is invalid. Constructivists will be interested to work in a topos without the law of excluded middle. If symmetry under a particular group G is of importance, one can use the topos consisting of all Gsets.
It is also possible to encode an algebraic theory, such as the theory of groups, as a topos, in the form of a classifying topos. The individual models of the theory, i.e. the groups in our example, then correspond to functors from the encoding topos to the category of sets that respect the topos structure.
Formal definition
When used for foundational work a topos will be defined axiomatically; set theory is then treated as a special case of topos theory. Building from category theory, there are multiple equivalent definitions of a topos. The following has the virtue of being concise:
A topos is a category that has the following two properties:
 All limits taken over finite index categories exist.
 Every object has a power object. This plays the role of the powerset in set theory.
Formally, a power object of an object is a pair with , which classifies relations, in the following sense. First note that for every object , a morphism ("a family of subsets") induces a subobject . Formally, this is defined by pulling back along . The universal property of a power object is that every relation arises in this way, giving a bijective correspondence between relations and morphisms .
From finite limits and power objects one can derive that
 All colimits taken over finite index categories exist.
 The category has a subobject classifier.
 The category is Cartesian closed.
In some applications, the role of the subobject classifier is pivotal, whereas power objects are not. Thus some definitions reverse the roles of what is defined and what is derived.
Logical functors
A logical functor is a functor between toposes that preserves finite limits and power objects. Logical functors preserve the structures that toposes have. In particular, they preserve finite colimits, subobject classifiers, and exponential objects.^{[6]}
Explanation
A topos as defined above can be understood as a Cartesian closed category for which the notion of subobject of an object has an elementary or firstorder definition. This notion, as a natural categorical abstraction of the notions of subset of a set, subgroup of a group, and more generally subalgebra of any algebraic structure, predates the notion of topos. It is definable in any category, not just topoi, in secondorder language, i.e. in terms of classes of morphisms instead of individual morphisms, as follows. Given two monics m, n from respectively Y and Z to X, we say that m ≤ n when there exists a morphism p: Y → Z for which np = m, inducing a preorder on monics to X. When m ≤ n and n ≤ m we say that m and n are equivalent. The subobjects of X are the resulting equivalence classes of the monics to it.
In a topos "subobject" becomes, at least implicitly, a firstorder notion, as follows.
As noted above, a topos is a category C having all finite limits and hence in particular the empty limit or final object 1. It is then natural to treat morphisms of the form x: 1 → X as elements x ∈ X. Morphisms f: X → Y thus correspond to functions mapping each element x ∈ X to the element fx ∈ Y, with application realized by composition.
One might then think to define a subobject of X as an equivalence class of monics m: X′ → X having the same image { mx  x ∈ X′ }. The catch is that two or more morphisms may correspond to the same function, that is, we cannot assume that C is concrete in the sense that the functor C(1,): C → Set is faithful. For example the category Grph of graphs and their associated homomorphisms is a topos whose final object 1 is the graph with one vertex and one edge (a selfloop), but is not concrete because the elements 1 → G of a graph G correspond only to the selfloops and not the other edges, nor the vertices without selfloops. Whereas the secondorder definition makes G and the subgraph of all selfloops of G (with their vertices) distinct subobjects of G (unless every edge is, and every vertex has, a selfloop), this imagebased one does not. This can be addressed for the graph example and related examples via the Yoneda Lemma as described in the Further examples section below, but this then ceases to be firstorder. Topoi provide a more abstract, general, and firstorder solution.
As noted above, a topos C has a subobject classifier Ω, namely an object of C with an element t ∈ Ω, the generic subobject of C, having the property that every monic m: X′ → X arises as a pullback of the generic subobject along a unique morphism f: X → Ω, as per Figure 1. Now the pullback of a monic is a monic, and all elements including t are monics since there is only one morphism to 1 from any given object, whence the pullback of t along f: X → Ω is a monic. The monics to X are therefore in bijection with the pullbacks of t along morphisms from X to Ω. The latter morphisms partition the monics into equivalence classes each determined by a morphism f: X → Ω, the characteristic morphism of that class, which we take to be the subobject of X characterized or named by f.
All this applies to any topos, whether or not concrete. In the concrete case, namely C(1,) faithful, for example the category of sets, the situation reduces to the familiar behavior of functions. Here the monics m: X′ → X are exactly the injections (oneone functions) from X′ to X, and those with a given image { mx  x ∈ X′ } constitute the subobject of X corresponding to the morphism f: X → Ω for which f^{−1}(t) is that image. The monics of a subobject will in general have many domains, all of which however will be in bijection with each other.
To summarize, this firstorder notion of subobject classifier implicitly defines for a topos the same equivalence relation on monics to X as had previously been defined explicitly by the secondorder notion of subobject for any category. The notion of equivalence relation on a class of morphisms is itself intrinsically secondorder, which the definition of topos neatly sidesteps by explicitly defining only the notion of subobject classifier Ω, leaving the notion of subobject of X as an implicit consequence characterized (and hence namable) by its associated morphism f: X → Ω.
Further examples and nonexamples
Every Grothendieck topos is an elementary topos, but the converse is not true (since every Grothendieck topos is cocomplete, which is not required from an elementary topos).
The categories of finite sets, of finite Gsets (actions of a group G on a finite set), and of finite graphs are elementary topoi that are not Grothendieck topoi.
If C is a small category, then the functor category Set^{C} (consisting of all covariant functors from C to sets, with natural transformations as morphisms) is a topos. For instance, the category Grph of graphs of the kind permitting multiple directed edges between two vertices is a topos. Such a graph consists of two sets, an edge set and a vertex set, and two functions s,t between those sets, assigning to every edge e its source s(e) and target t(e). Grph is thus equivalent to the functor category Set^{C}, where C is the category with two objects E and V and two morphisms s,t: E → V giving respectively the source and target of each edge.
The Yoneda lemma asserts that C^{op} embeds in Set^{C} as a full subcategory. In the graph example the embedding represents C^{op} as the subcategory of Set^{C} whose two objects are V' as the onevertex noedge graph and E' as the twovertex oneedge graph (both as functors), and whose two nonidentity morphisms are the two graph homomorphisms from V' to E' (both as natural transformations). The natural transformations from V' to an arbitrary graph (functor) G constitute the vertices of G while those from E' to G constitute its edges. Although Set^{C}, which we can identify with Grph, is not made concrete by either V' or E' alone, the functor U: Grph → Set^{2} sending object G to the pair of sets (Grph(V' ,G), Grph(E' ,G)) and morphism h: G → H to the pair of functions (Grph(V' ,h), Grph(E' ,h)) is faithful. That is, a morphism of graphs can be understood as a pair of functions, one mapping the vertices and the other the edges, with application still realized as composition but now with multiple sorts of generalized elements. This shows that the traditional concept of a concrete category as one whose objects have an underlying set can be generalized to cater for a wider range of topoi by allowing an object to have multiple underlying sets, that is, to be multisorted.
The category of pointed sets with pointpreserving functions is not a topos, since it doesn't have power objects: if were the power object of the pointed set , and denotes the pointed singleton, then there is only one pointpreserving function , but the relations in are as numerous as the pointed subsets of . The category of abelian groups is also not a topos, for a similar reason: every group homomorphism must map 0 to 0.
See also
 History of topos theory
 Homotopy hypothesis
 Intuitionistic type theory
 ∞topos
 Quasitopos
 Geometric logic
Notes
 ^ Illusie 2004
 ^ Caramello, Olivia (2016). Grothendieck toposes as unifying `bridges' in Mathematics (PDF) (HDR). Paris Diderot University (Paris 7).
 ^ Caramello, Olivia (2017). Theories, Sites, Toposes: Relating and studying mathematical theories through topostheoretic `bridges. Oxford University Press. doi:10.1093/oso/9780198758914.001.0001. ISBN 9780198758914.
 ^ Artin, Michael; Mazur, Barry (1969). Etale homotopy. Lecture Notes in Mathematics. Vol. 100. SpringerVerlag. doi:10.1007/BFb0080957. ISBN 9783540361428.
 ^ Friedlander, Eric M. (1982), Étale homotopy of simplicial schemes, Annals of Mathematics Studies, vol. 104, Princeton University Press, ISBN 9780691083179
 ^ McLarty 1992, p. 159
References
 Some gentle papers
 Edwards, D.A.; Hastings, H.M. (Summer 1980). "Čech Theory: its Past, Present, and Future". Rocky Mountain Journal of Mathematics. 10 (3): 429–468. doi:10.1216/RMJ1980103429. JSTOR 44236540.
 Baez, John. "Topos theory in a nutshell". A gentle introduction.
 Steven Vickers: "Toposes pour les nuls" and "Toposes pour les vraiment nuls." Elementary and even more elementary introductions to toposes as generalized spaces.
 Illusie, Luc (2004). "What is...A Topos?" (PDF). Notices of the AMS. 51 (9): 160–1.
The following texts are easypaced introductions to toposes and the basics of category theory. They should be suitable for those knowing little mathematical logic and set theory, even nonmathematicians.
 Lawvere, F. William; Schanuel, Stephen H. (1997). Conceptual Mathematics: A First Introduction to Categories. Cambridge University Press. ISBN 9780521478175. An "introduction to categories for computer scientists, logicians, physicists, linguists, etc." (cited from cover text).
 Lawvere, F. William; Rosebrugh, Robert (2003). Sets for Mathematics. Cambridge University Press. ISBN 9780521010603. Introduces the foundations of mathematics from a categorical perspective.
Grothendieck foundational work on toposes:
 Grothendieck, A.; Verdier, J.L. (1972). Théorie des Topos et Cohomologie Etale des Schémas. Lecture notes in mathematics. Vol. 269. Springer. doi:10.1007/BFb0081551. ISBN 9783540375494. Tome 2 270 doi:10.1007/BFb0061319 ISBN 9783540379874
The following monographs include an introduction to some or all of topos theory, but do not cater primarily to beginning students. Listed in (perceived) order of increasing difficulty.
 McLarty, Colin (1992). Elementary Categories, Elementary Toposes. Clarendon Press. ISBN 9780191589492. A nice introduction to the basics of category theory, topos theory, and topos logic. Assumes very few prerequisites.
 Goldblatt, Robert (2013) [1984]. Topoi: The Categorial Analysis of Logic. Courier Corporation. ISBN 9780486317960. A good start. Available online at Robert Goldblatt's homepage.
 Bell, John L. (2001). "The Development of Categorical Logic". In Gabbay, D.M.; Guenthner, Franz (eds.). Handbook of Philosophical Logic. Vol. 12 (2nd ed.). Springer. pp. 279–. ISBN 9781402030918. Version available online at John Bell's homepage.
 MacLane, Saunders; Moerdijk, Ieke (2012) [1994]. Sheaves in Geometry and Logic: A First Introduction to Topos Theory. Springer. ISBN 9781461209270. More complete, and more difficult to read.
 Barr, Michael; Wells, Charles (2013) [1985]. Toposes, Triples and Theories. Springer. ISBN 9781489900234. (Online version). More concise than Sheaves in Geometry and Logic, but hard on beginners.
 Reference works for experts, less suitable for first introduction
 Edwards, D.A.; Hastings, H.M. (1976). Čech and Steenrod homotopy theories with applications to geometric topology. Lecture Notes in Maths. Vol. 542. SpringerVerlag. doi:10.1007/BFb0081083. ISBN 9783540381037.
 Borceux, Francis (1994). Handbook of Categorical Algebra: Volume 3, Sheaf Theory. Encyclopedia of Mathematics and its Applications. Vol. 52. Cambridge University Press. ISBN 9780521441803. The third part of "Borceux' remarkable magnum opus", as Johnstone has labelled it. Still suitable as an introduction, though beginners may find it hard to recognize the most relevant results among the huge amount of material given.
 Johnstone, Peter T. (2014) [1977]. Topos Theory. Courier. ISBN 9780486493367. For a long time the standard compendium on topos theory. However, even Johnstone describes this work as "far too hard to read, and not for the fainthearted."
 Johnstone, Peter T. (2002). Sketches of an Elephant: A Topos Theory Compendium. Vol. 2. Clarendon Press. ISBN 9780198515982. As of early 2010, two of the scheduled three volumes of this overwhelming compendium were available.
 Caramello, Olivia (2017). Theories, Sites, Toposes: Relating and studying mathematical theories through topostheoretic `bridges. Oxford University Press. doi:10.1093/oso/9780198758914.001.0001. ISBN 9780198758914.
 Books that target special applications of topos theory
 Pedicchio, Maria Cristina; Tholen, Walter; Rota, G.C., eds. (2004). Categorical Foundations: Special Topics in Order, Topology, Algebra, and Sheaf Theory. Encyclopedia of Mathematics and its Applications. Vol. 97. Cambridge University Press. ISBN 9780521834148. Includes many interesting special applications.