nLab compactly generated topological space

Redirected from "k-topological space".
Contents

Context

Topology

topology (point-set topology, point-free topology)

see also differential topology, algebraic topology, functional analysis and topological homotopy theory

Introduction

Basic concepts

Universal constructions

Extra stuff, structure, properties

Examples

Basic statements

Theorems

Analysis Theorems

topological homotopy theory

Contents

Idea

A topological space is called compactly generated – also called a “k-space”1 (Gale 1950, 1., following lectures by Hurewicz in 1948), “Kelley space” (Gabriel & Zisman 1967, III.4), or “kaonic space” (Postnikov 1982, p. 34) – if its topology is detected by the continuous images of compact Hausdorff spaces inside it.

As opposed to general topological spaces, compactly generated spaces form a cartesian closed category while still being general enough for most purposes of general topology, hence form a convenient category of topological spaces (Steenrod 1967) and as such have come to be commonly used in the foundations of algebraic topology and homotopy theory, especially in their modern guise as compactly generated weakly Hausdorff spaces, due to McCord 1969, Sec. 2.

Definition

Definition

(kk-continuous functions)
A function f:XYf\colon X \to Y between underlying sets of topological spaces is called kk-continuous if for all compact Hausdorff spaces CC and continuous functions t:CXt \colon C \to X the composite ft:CYf \circ t \colon C \to Y is continuous.

Proposition

(equivalent characterizations of compact generation)
The following conditions on a topological space XX are equivalent:

  1. For all spaces YY and all functions f:XYf \colon X \to Y (of underlying sets), ff is continuous if and only if ff is kk-continuous (Def. ).

  2. There is a set SS (instead of a proper class) of compact Hausdorff spaces such that the previous condition holds for all CSC \in S.

  3. XX is an identification space of a disjoint union of compact Hausdorff spaces.

  4. A subspace UXU \subseteq X is open if and only if the preimage t 1(U)t^{-1}(U) under any continuous function t:CXt \colon C \to X out of a compact Hausdorff space CC is open.

Definition

(k-spaces)
A topological space XX is a kk-space if any (hence all) of the conditions in Prop. hold.

Remark

(terminology)
Some authors say that a kk-space (Def. ) is compactly generated, while others reserve that term for a kk-space which is also weak Hausdorff, meaning that the image of any t:CXt\colon C\to X is closed (when CC is compact Hausdorff). Some authors (especially the early authors on the subject) go on to require a Hausdorff space, but this seems to be unnecessary.

Examples

Examples of compactly generated spaces include

Example

Every compact Hausdorff space is compactly generated.

Note: it is not generally true that compact spaces are compactly generated, even if they are weakly Hausdorff. An example is the square of the one-point compactification of the rationals \mathbb{Q} with its standard topology. See for example this MathStackExchange post.

Example

Every locally compact Hausdorff space is compactly generated.

Example

Every topological manifold is compactly generated

Example

Every CW-complex is a compactly generated topological space.

Proof

Since a CW-complex XX is a colimit in Top over attachments of standard n-disks D n iD^{n_i} (its cells), by the characterization of colimits in TopTop (prop.) a subset of XX is open or closed precisely if its restriction to each cell is open or closed, respectively. Since the nn-disks are compact, this implies one direction: if a subset AA of XX intersected with all compact subsets is closed, then AA is closed.

For the converse direction, since a CW-complex is a Hausdorff space and since compact subspaces of Hausdorff spaces are closed, the intersection of a closed subset with a compact subset is closed.

Example

Every first countable space is a compactly generated space.

Proof idea

Since the topology is determined by convergent sequences = maps from one-point compactification {}\mathbb{N} \cup \{\infty\}); these include all Frechet–Uryson spaces.

Properties

Coreflection into topological spaces

Definition

(category of k-spaces)
We write

(1)kTopTop k\Top \xhookrightarrow{\;\;\;\;} Top

for the category of kk-spaces (Def. ) with continuous functions between them, hence for the full subcategory of Top on the k-spaces.

Proposition

The inclusion (1) is that of a coreflective subcategory

(2)kTopkTop k Top \underoverset {\underset{k}{\longleftarrow}} {\overset{}{\hookrightarrow}} {\;\;\;\; \bot \;\;\;\;} Top

The coreflection kk is sometimes called kk-ification (May 1999, p. 49).
Proof

The reflection functor kk is constructed as follows:

We take k(X)Xk(X) \coloneqq X on underlying sets, and equip this with the topology whose closed sets are those whose intersection with compact Hausdorff subsets of (the original topology on) XX is closed (in the original topology on XX). Then k(X)k(X) has all the same closed sets and possibly more, hence all the same open sets and possibly more.

In particular, the identity map id:k(X)Xid \colon k(X)\to X is continuous, and forms the counit of the coreflection. Thus this coreflection has a counit which is both a monomorphism as well as an epimorphism, i.e. a “bimorphism”—such a coreflection is sometimes called a “bicoreflection.”

Remark

There is also the category Top k\Top_k of all topological spaces and kk-continuous maps (Def. ). But the composite sequence of inclusions

kTopTopTop k, k\Top \xhookrightarrow{\;} \Top \xrightarrow{\;} \Top_k \,,

of which the first is the full inclusion (1) and the second is bijective on objects kTopTop kk\Top \to Top_k, is an equivalence of categories.

Namely, the identity morphism id:Xk(X)id \colon X \to k(X) is kk-continuous, so that the adjunction counit from Prop. becomes an isomorphism in Top k\Top_k. This shows that kTopTop kk\Top \to \Top_k is essentially surjective, and it is fully faithful since any kk-continuous function between kk-spaces is kk-continuous; hence it is an equivalence.

Remark

Since kTopTopk\Top \hookrightarrow \Top is coreflective, it follows that kTopk\Top is complete and cocomplete. Its colimits are constructed as in Top, but its limits are the kk-ification (2) of limits in Top.

Notice that this is nontrivial already for products: the kk-space product X×YX \times Y is the kk-ification of the usual product topology. The kk-space product is better behaved in many ways; e.g. it enables geometric realization to preserve products (and all finite limits), and the product of two CW complexes to be another CW complex.

Reflection into weak Hausdorff spaces

Definition

Write

hkTopkTop h k Top \xhookrightarrow{\;\;\;} k Top

for the further full subcategory inside that of k-spaces (Def. ) on those which in addition are weak Hausdorff spaces.

Proposition

(cgwh spaces reflective in cg spaces)
The full subcategory-inclusion of weak Hausdorff spaces in k-spaces (Def. ) is a reflective subcategory inclusion:

hkTophkTop h k Top \underoverset {\underset{}{\hookrightarrow}} {\overset{ h }{\longleftarrow}} {\;\;\;\; \bot \;\;\;\; } k Top

(e.g. Strickland 2009, Prop. 2.22)

Remark

(sequence of (co-)reflections)
In summary, Prop. and Prop. yield a sequence of adjoint functors of this form:

hkTophkTopkTop h k Top \underoverset {\underset{}{\hookrightarrow}} {\overset{ h }{\longleftarrow}} {\;\;\;\; \bot \;\;\;\; } k Top \underoverset {\underset{k}{\longleftarrow}} {\overset{}{\hookrightarrow}} {\;\;\;\; \bot \;\;\;\;} Top

The classical model structure on topological spaces restricts along these (co-)reflective embeddings to a Quillen equivalent model structure on compactly generated topological spaces. See there for more.

Cartesian closure

The categories kTopTop kk\Top\simeq \Top_k are cartesian closed. (While in Top only some objects are exponentiable, see exponential law for spaces.) For arbitrary spaces XX and YY, define the test-open or compact-open topology on Top k(X,Y)\Top_k(X,Y) to have the subbase of sets M(t,U)M(t,U), for a given compact Hausdorff space CC, a map t:CXt\colon C \to X, and an open set UU in YY, where M(t,U)M(t,U) consists of all kk-continuous functions f:XYf\colon X \to Y such that f(t(C))Uf(t(C))\subseteq U.

(This is slightly different from the usual compact-open topology if XX happens to have non-Hausdorff compact subspaces; in that case the usual definition includes such subspaces as tests, while the above definition excludes them. Of course, if XX itself is Hausdorff, then the two become identical.)

With this topology, Top k(X,Y)\Top_k(X,Y) becomes an exponential object in Top kTop_k. It follows, by Yoneda lemma arguments (prop.), that the bijection

kTop(X×Y,Z)kTop(X,kTop(Y,Z)) k\Top(X \times Y, Z) \longrightarrow k Top\big(X,k\Top(Y,Z)\big)

is actually an isomorphism in Top k\Top_k, which we may call a kk-homeomorphism (e.g. Strickland 09, prop. 2.12). In fact, it is actually a homeomorphism, i.e. an isomorphism already in TopTop.

It follows that the category kTopk\Top of kk-spaces and continuous maps is also cartesian closed, since it is equivalent to Top k\Top_k. Its exponential object is the kk-ification of the one constructed above for Top k\Top_k. Since for kk-spaces, kk-continuous implies continuous, the underlying set of this exponential space kTop(X,Y)k\Top(X,Y) is the set of all continuous maps from XX to YY. Thus, when XX is Hausdorff, we can identify this space with the kk-ification of the usual compact-open topology on Top(X,Y)Top(X,Y).

Finally, this all remains true if we also impose the weak Hausdorff, or Hausdorff, conditions.

Remark

(failure of local cartesian closure)
Unfortunately neither of the above categories is locally cartesian closed (Cagliari-Matovani-Vitale 1995, p. 4)

However, if KK is the category of not-necessarily-weak-Hausdorff k-spaces, and AA and BB are k-spaces that are weak Hausdorff, then the pullback (base change) functor K /BK /AK_{/B} \to K_{/A} has a right adjoint. (see Booth & Brown 1978a, Thm. 3.5 & 7.3; May & Sigurdsson 2006, §1.3.7-§1.3.9).

There is still a lot of work on fibred exponential laws and their applications. One reason for the success and difficulties is that it is easy to give a topology on the space of closed subsets of a space XX by regarding this as the space of maps to the Sierpinski space (the set {0,1}\{0,1\} of truth values in which {1}\{1\} is closed but not open). From this one can get an exponential law for spaces over BB if BB is T 0 T_0 , so that all fibres of spaces over BB are closed in their total space. Note that weak Hausdorff implies T 0 T_0 .


Relation to locally compact Hausdorff spaces

Proposition

Every locally compact Hausdorff space is a k-space and is weakly Hausdorff:

LCHausSphkTopSp LCHausSp \xhookrightarrow{\;} h k TopSp

(Dugundji 1966, XI Thm. 9.3; Strickland 2009, Prop. 1.7)

Proposition

The product topological space of a locally compact Hausdorff space with a k-space is already a k-space (i.e. without need of k-ification).

(e.g. Lewis 1978, Lem. 2.4; Piccinini 1992, Thm. B.6, Strickland 2009, Prop. 2.6)

This is proven in Dugundji 1966, XI Thm. 9.4 (also Piccinini 92, Thm. B.4) assuming Hausdorffness, and without that assumption in Escardo, Lawson & Simpson 2004, Cor. 3.4 (iii). Moreover:
Proposition

(k-spaces are the colimits in Top of compact Hausdorff spaces)
A topological space is a k-space (Def. ) iff it is a colimit as formed in Top (according to this Prop.) of a diagram of compact Hausdorff spaces.

(Escardo, Lawson & Simpson 2004, Lem. 3.2 (v))

Relation to compactly generated topological space

Insice kk-spaces there is the further coreflective subcategory DTopD Top of Delta-generated topological spaces:

TopkkTop QuDDTop Qu. Top \underoverset { \underset{ k }{\longrightarrow} } { {\hookleftarrow} } { \;\;\;\;\;\;\bot\;\;\;\;\;\; } k Top_{Qu} \underoverset { \underset{ D }{\longrightarrow} } { {\hookleftarrow} } { \;\;\;\;\;\;\bot\;\;\;\;\;\; } D Top_{Qu} \,.

Both of these coreflections are Quillen equivalences with respect to the classical model structure on topological spaces and the induced model structure on compactly generated topological spaces and the model structure on Delta-generated topological spaces (Gaucher 2009, Haraguchi 2013).

Regularity

(Cagliari-Matovani-Vitale 95, p. 3).

In particular this implies that in these categories pullback preserves effective epimorphisms (see there).

Homotopy

Proposition

For every topological space XX, the canonical continuous function from the kk-ification (the adjunction counit) is a weak homotopy equivalence, hence induces an isomorphism on all homotopy groups:

k(X)wheε X kX,i.e.π 0(k(X))π 0(X),andxXn +(π n(k(X),x)π n(X,x)). k(X) \underoverset {whe} {\;\varepsilon^k_X\;} {\longrightarrow} X \,, \;\;\; \text{i.e.} \;\;\; \pi_0\big(k(X)\big) \xrightarrow{\;\sim\;} \pi_0(X) \,, \;\; \text{and} \;\; \underset{ {x \in X} \atop {n \in \mathbb{N}_+} }{\forall} \Big( \pi_n\big( k(X),\,x \big) \xrightarrow{\sim} \pi_n(X,\, x) \Big) \,.

E.g. Vogt 1971, Prop. 1.2 (h). The proof is spelled out here at Introduction to Homotopy Theory.

References

k-Spaces and CG Hausdorff spaces

The idea of compactly generated Hausdorff spaces first appears in print in:

where it is attributed to Witold Hurewicz, who introduced the concept in a lecture series given in Princeton, 1948-49, which Gale attended.2

Early textbook accounts, assuming the Hausdorff condition:

also:

Influential emphasis of the usefulness of the notion as providing a convenient category of topological spaces:

Early discussion in the context of geometric realization of simplicial topological spaces:

  • Saunders MacLane, Section 4 of: The Milgram bar construction as a tensor product of functors, In: F.P. Peterson (eds.) The Steenrod Algebra and Its Applications: A Conference to Celebrate N.E. Steenrod’s Sixtieth Birthday, Lecture Notes in Mathematics 168, Springer 1970 (doi:10.1007/BFb0058523, pdf)

and briefly in:

More history and early references, with emphasis on category-theoretic aspects:

  • Horst Herrlich, George Strecker, Section 3.4 of: Categorical topology – Its origins as exemplified by the unfolding of the theory of topological reflections and coreflections before 1971 (pdf), pages 255-341 in: C. E. Aull, R Lowen (eds.), Handbook of the History of General Topology. Vol. 1 , Kluwer 1997 (doi:10.1007/978-94-017-0468-7)

The terminology “kaonic spaces”, or rather the Russian version “каонные пространства” is used in

  • M M Postnikov, Введение в теорию Морса, Наука 1971 (web)

  • M M Postnikov, p. 34 of: Лекции по алгебраической топологии. Основы теории гомотопий, Наука 1982 (web)

Discussion of k-spaces in the generality of subcategory-generated spaces, including Delta-generated topological spaces:

Proof that k-spaces form a regular category:

Further accounts:

CG weak Hausdorff spaces

The idea of generalizing compact generation to weakly Hausdorff spaces appears in:

  • Michael C. McCord, Section 2 of: Classifying Spaces and Infinite Symmetric Products, Transactions of the American Mathematical Society, Vol. 146 (Dec., 1969), pp. 273-298 (jstor:1995173, pdf)

where it is attributed to John C. Moore.

Review in this generality of CG weakly Hausdorff spaces:

Brief review in preparation of the model structure on compactly generated topological spaces:

Review with focus on compactly generated topological G-spaces in equivariant homotopy theory and specifically equivariant bundle-theory:

Exponential law for parameterized topological spaces

On exponential objects (internal homs) in slice categories of (compactly generated) topological spaces – see at parameterized homotopy theory):

And with an eye towards parameterized homotopy theory:


  1. The reason for choosing the term “k-space” in Gale 1950 seems to be lost in history. The “k” is not for “Kelley”, as Kelley 1955 came later. It might have been an allusion to the German word kompakt.

  2. This is according to personal communication by David Gale to William Lawvere in 2003, forwarded by Lawvere to Martin Escardo at that time, and then kindly forwarded by Escardo to the nForum in 2021; see there.

Last revised on March 28, 2024 at 21:15:11. See the history of this page for a list of all contributions to it.