nLab Delta-generated topological space

Redirected from "Delta-generated space".

Contents

Context

Topology

Definition
Properties

Coreflection into all topological spaces
Topological homotopy type and diffeological shape
Model category structure
As a convenient category of topological spaces

Related concepts
References

General
Relation to diffeological spaces

Definition

( $\Delta$ -Generated spaces)

A $\Delta$ -generated space (alias numerically generated space) (Smith, Dugger 03) is a topological space $X$ whose topology is the final topology induced by all continuous functions of the form $\Delta^n_{top} \to X$ , hence those whose domain $\Delta^n_{top}$ is one of the standard topological simplices, for $n \in \mathbb{N}$ .

A morphism between $\Delta$ -generated spaces is just a continuous function, hence the category of $\Delta$ -generated spaces is the full subcategory on these spaces inside all TopologicalSpaces,

Remark

(as colimits of topological simplices)

Equivalently, the class of $\Delta$ -generated spaces is the closure of the set of topological simplices $\Delta^n_{top}$ under small colimits in topological spaces (see at Top – universal constructions).

Remark

(as Euclidean-generated spaces)

For each $n$ the topological simplex $\Delta^n$ is a retract of the ambient Euclidean space/Cartesian space $\mathbb{R}^n$ (as a non-empty convex subset of a Euclidean space it is in fact an absolute retract). Hence the identity function on $\Delta^n$ factors as

id \;\colon\; \Delta^n_{top} \overset{\;\;\; i_n \;\;\;}{\hookrightarrow} \mathbb{R}^n \overset{\;\;\; p_n \;\;\;}{\longrightarrow} \Delta^n_{top} \,;

and it follows that every continuous function $f$ with domain the topological simplex extends as a continuous function to Euclidean space:

\array{ \Delta^m_{top} &\overset{f}{\longrightarrow}& X \\ \mathllap{{}^{i_n}}\big\downarrow & \nearrow _{\mathrlap{\exists}} \\ \mathbb{R}^n }

Therefore the condition that a topological space $X$ be $\Delta$ -generated (Def. ) is equivalent to saying that its topology is final with respect to all continuous functions $\mathbb{R}^n \to X$ out of Euclidean/Cartesian spaces.

Remark

(as D-topological spaces)

By Prop. below, the Euclidean-generated spaces and hence, by Remark , the $\Delta$ -generated spaces, are equivalently those that arise from equipping a diffeological space with its D-topology, hence are, in this precise sense, the D-topological spaces. Luckily, “D-topological space” may also serve as an abbreviation for “Delta-generated topological space”.

Properties

Coreflection into all topological spaces

Proposition

(adjunction between topological spaces and diffeological spaces)

There is a pair of adjoint functors

(1)

TopSp \underoverset{ \underset{ Cdfflg }{\longrightarrow} }{ \overset{ Dtplg }{\longleftarrow} }{\phantom{AA}\bot\phantom{AA}} DifflgSp

between the categories of TopologicalSpaces and of DiffeologicalSpaces, where

$Cdfflg$ takes a topological space $X$ to the continuous diffeology, namely the diffeological space on the same underlying set $X_s$ whose plots $U_s \to X_s$ are the continuous functions (from the underlying topological space of the domain $U$ ).
$Dtplg$ takes a diffeological space to the diffeological topology (D-topology), namely the topological space with the same underlying set $X_s$ and with the final topology that makes all its plots $U_{s} \to X_{s}$ into continuous functions: called the D-topology.

Hence a subset $O \subset \flat X$ is an open subset in the D-topology precisely if for each plot $f \colon U \to X$ the preimage $f^{-1}(O) \subset U$ is an open subset in the Cartesian space $U$ .

Moreover:

the fixed points of this adjunction $X \in$ TopologicalSpaces (those for which the counit is an isomorphism, hence here: a homeomorphism) are precisely the Delta-generated topological spaces (i.e. D-topological spaces):

$X \;\,\text{is}\;\Delta\text{-generated} \;\;\;\;\; \Leftrightarrow \;\;\;\;\; Dtplg(Cdfflg(X)) \underoverset{\simeq}{\;\;\epsilon_X\;\;}{\longrightarrow} X$
this is an idempotent adjunction, which exhibits $\Delta$ -generated/D-topological spaces as a reflective subcategory inside diffeological spaces and a coreflective subcategory inside all topological spaces:

(2)

TopologicalSpaces \underoverset { \underset{ Cdfflg }{\longrightarrow} } { \overset{ }{\hookleftarrow} } {\phantom{AA}\bot\phantom{AA}} DTopologicalSpaces \underoverset { \underset{ }{\hookrightarrow} } { \overset{ Dtplg }{\longleftarrow} } {\phantom{AA}\bot\phantom{AA}} DiffeologicalSpaces

Finally, these adjunctions are a sequence of Quillen equivalences with respect to the:


classical model structure on topological spaces	model structure on D-topological spaces	model structure on diffeological spaces

Caution: There was a gap in the original proof that $DTopologicalSpaces \simeq_{Quillen} DiffeologicalSpaces$ . The gap is claimed to be filled now, see the commented references here.

Essentially these adjunctions and their properties are observed in Shimakawa, Yoshida & Haraguchi 2010, Prop. 3.1, Prop. 3.2, Lem. 3.3, see also Christensen, Sinnamon & Wu 2014, Sec. 3.2. The model structures and Quillen equivalences are due to Haraguchi 13, Thm. 3.3 (on the left) and Haraguchi-Shimakawa 13, Sec. 7 (on the right).

Proof

We spell out the existence of the idempotent adjunction (2):

First, to see we have an adjunction $Dtplg \dashv Cdfflg$ , we check the hom-isomorphism (here).

Let $X \in DiffeologicalSpaces$ and $Y \in TopologicalSpaces$ . Write $(-)_s$ for the underlying sets. Then a morphism, hence a continuous function of the form

f \;\colon\; Dtplg(X) \longrightarrow Y \,,

is a function $f_s \colon X_s \to Y_s$ of the underlying sets such that for every open subset $A \subset Y_s$ and every smooth function of the form $\phi \colon \mathbb{R}^n \to X$ the preimage $(f_s \circ \phi_s)^{-1}(A) \subset \mathbb{R}^n$ is open. But this means equivalently that for every such $\phi$ , $f \circ \phi$ is continuous. This, in turn, means equivalently that the same underlying function $f_s$ constitutes a smooth function $\widetilde f \;\colon\; X \longrightarrow Cdfflg(Y)$ .

In summary, we thus have a bijection of hom-sets

\array{ Hom( Dtplg(X), Y ) &\simeq& Hom(X, Cdfflg(Y)) \\ f_s &\mapsto& (\widetilde f)_s = f_s }

given simply as the identity on the underlying functions of underlying sets. This makes it immediate that this hom-isomorphism is natural in $X$ and $Y$ and this establishes the adjunction.

Next, to see that the D-topological spaces are the fixed points of this adjunction, we apply the above natural bijection on hom-sets to the case

\array{ Hom( Dtplg(Cdfflg(Z)), Y ) &\simeq& Hom(Cdfflg(Z), Cdfflg(Y)) \\ (\epsilon_Z)_s &\mapsto& (\mathrm{id})_s }

to find that the counit of the adjunction

Dtplg(Cdfflg(X)) \overset{\epsilon_X}{\longrightarrow} X

is given by the identity function on the underlying sets $(\epsilon_X)_s = id_{(X_s)}$ .

Therefore $\eta_X$ is an isomorphism, namely a homeomorphism, precisely if the open subsets of $X_s$ with respect to the topology on $X$ are precisely those with respect to the topology on $Dtplg(Cdfflg(X))$ , which means equivalently that the open subsets of $X$ coincide with those whose pre-images under all continuous functions $\phi \colon \mathbb{R}^n \to X$ are open. This means equivalently that $X$ is a D-topological space.

Finally, to see that we have an idempotent adjunction, it is sufficient to check (by this Prop.) that the comonad

Dtplg \circ Cdfflg \;\colon\; TopologicalSpaces \to TopologicalSpaces

is an idempotent comonad, hence that

Dtplg \circ Cdfflg \overset{ Dtplg \cdot \eta \cdot Cdfflg }{\longrightarrow} Dtplg \circ Cdfflg \circ Dtplg \circ Cdfflg

is a natural isomorphism. But, as before for the adjunction counit $\epsilon$ , we have that also the adjunction unit $\eta$ is the identity function on the underlying sets. Therefore, this being a natural isomorphism is equivalent to the operation of passing to the D-topological refinement of the topology of a topological space being an idempotent operation, which is clearly the case.

Topological homotopy type and diffeological shape

Definition

(diffeological singular simplicial set)

Consider the simplicial diffeological space

\array{ \Delta & \overset{ \Delta^\bullet_{diff} }{ \longrightarrow } & DiffeologicalSpaces \\ [n] &\mapsto& \Delta^n_{diff} \mathrlap{ \coloneqq \big\{ \vec x \in \mathbb{R}^{n+1} \;\vert\; \underset{i}{\sum} x^i = 1 \big\} } }

which in degree $n$ is the standard extended n-simplex inside Cartesian space $\mathbb{R}^{n+1}$ , equipped with its sub-diffeology.

This induces a nerve and realization adjunction between diffeological spaces and simplicial sets:

(3)

DiffeologicalSpaces \underoverset { \underset{Sing_{\mathrlap{diff}}}{\longrightarrow} } { \overset{ \left\vert - \right\vert_{\mathrlap{diff}} }{\longleftarrow} } { \phantom{AA}\bot\phantom{AA} } SimplicialSets \,,

where the right adjoint is the diffeological singular simplicial set functor $Sing_{diff}$ .

(e.g. Christensen-Wu 13, Def. 4.3)

Remark

(diffeological singular simplicial set as path ∞-groupoid)

Regarding simplicial sets as presenting ∞-groupoids, we may think of $Sing_{diff}(X)$ (Def. ) as the path ∞-groupoid of the diffeological space $X$ .

In fact, by the discussion at shape via cohesive path ∞-groupoid we have that $Sing_{diff}$ is equvialent to the shape of diffeological spaces regarded as objects of the cohesive (∞,1)-topos of smooth ∞-groupoids:

Sing_{diff} \;\simeq\; Shp \circ i \;\;\colon\;\; DiffeologicalSpaces \overset{i}{\hookrightarrow} SmoothGroupoids_{\infty} \overset{Shape}{\longrightarrow} Groupoids_\infty

Proposition

(topological homotopy type is cohesive shape of continuous diffeology)
For every $X \in$ TopologicalSpaces, the cohesive shape/path ∞-groupoid presented by its diffeological singular simplicial set (Def. , Remark ) of its continuous diffeology is naturally $\,$ weak homotopy equivalent to the homotopy type of $X$ presented by the ordinary singular simplicial set:

Sing_{diff} \big( Cdfflg(X) \big) \underoverset { \in \mathrm{W}_{wh} } {} {\longrightarrow} Sing(X) \,.

(Christensen & Wu 2013, Prop. 4.14)

Model category structure

Proposition

(model structure on Delta-generated topological spaces)
The category of $\Delta$ -generated spaces carries the structure of a cofibrantly generated model category with the same generating (acyclic) cofibrations as for the classical model structure on topological spaces and such that the coreflection into all TopologicalSpaces (Prop. ) is a Quillen equivalence to the classical model structure on topological spaces.

(Haraguchi 13, Theorem 3.3)

This Quillen equivalence factors through the model structure on compactly generated topological spaces (e.g. Gaucher 2007, p. 7):

Top_{Qu} \underoverset { \underset{ k }{\longrightarrow} } { {\hookleftarrow} } { \;\;\;\;\;\;\simeq_{\mathrlap{Qu}}\;\;\;\;\;\; } k Top_{Qu} \underoverset { \underset{ D }{\longrightarrow} } { {\hookleftarrow} } { \;\;\;\;\;\;\simeq_{\mathrlap{Qu}}\;\;\;\;\;\; } D Top_{Qu} \,.

As a convenient category of topological spaces

Proposition

The category of Euclidean-generated spaces/ $\Delta$ -generated spaces (Def. ) is a Cartesian closed category.

Explicitly, the internal hom $Maps_{DTop}$ is, equivalently:

the image under $Cdfflg$ (1) of the mapping space $Maps_{Top}(X,Y)$ with the compact-open topology:

$Maps_{DTop}(X,Y) \;\simeq\; Cdfflg \big( Maps_{Top} ( X ,\, Y ) \big) \,,$
the image under $Dtplg$ (1) of the internal hom $Maps_{Dfflg}$ formed in diffeological spaces:

$Maps_{DTop}(X,Y) \;\simeq\; Dtplg \big( Maps_{Dfflg} ( X ,\, Y ) \big) \,.$

The first statement is a special case of Vogt 1971, Thm. 3.6, as highlighted in Gaucher 2007, Sec. 2. The second statement is the image of SYH 10, Prop. 4.7 under

Dtplg

(using that

\nu = T \circ D

, in their notation from p. 4).

In fact, SYH 10, Prop. 4.7 state something stronger, topologically characterizing $Maps_{Dfflg}(X,Y)$ even before applying $Dtplg$ to it. This stronger statement has a nice form when specialized to CW-complexes:

Proposition

The category of Euclidean-generated spaces/ $\Delta$ -generated spaces (Def. ) contains all CW-complexes.

(SYH 10, Cor. 4.4)

Proposition

(diffeological internal hom out of CW-complexes)

If $X$ is a CW-complex, regarded as an object in $DTopSp$ via Prop. , then for every $A \,\in\, DTopSp$ their internal hom formed in diffeological spaces is isomorphic to the image under $Cdffl$ (1) of the mapping space $Maps_{Top}$ with its compact open topology:

X \,\in\, CWComplex \hookrightarrow DTopSp \;\;\;\;\;\; \Rightarrow \;\;\;\;\;\; \underset{ A \,\in\, DTopSp }{\forall} Maps_{Dfflg} \big( X ,\, A \big) \;\; \simeq Cdfflg \, Maps_{Top} \left( X ,\, A \right) \,.

Proof

This is the following combination of statements from SYH 10:

Prop. 4.7 there says that, in general:

$Maps_{Dfflg}\big( X ,\, A\big) \;\simeq\; Cdfflgl \big( \mathbf{smap}(X,Y) \big)$

(where “ $\mathbf{smap}$ ” is defined on their p. 6),
Prop. 4.3 there implies that, when $X$ is a CW-complex, as assumed here:

$Cdfflg \big( \mathbf{smap}(X,Y) \big) \;\simeq\; Cdfflg \big( Maps_{Top}(X,Y) \big) \,.$

In summary:

Proposition

(Euclidean-generated spaces are convenient)

The category of Euclidean-generated spaces/ $\Delta$ -generated spaces (Def. ) is a convenient category of topological spaces in that:

it is coreflective in TopSp (by Prop. )
it is complete and cocomplete category

(by Vogt 1971; SYH 10, Prop. 3.4)

it is locally presentable (FR 08, Cor. 3.7),
it contains all CW-complexes (Prop. ),
it is cartesian closed, with internal hom expressible as in Prop. .

Moreover, in further summary of the discussion further above, this convenient category of topological spaces is:

a full subcategory of the quasi-topos of diffeological spaces (see there),
which is in turn a full subcategory of the cohesive topos of smooth sets (see there);
which in turn is a full sub- $(\infty,1)$ -category of the cohesive $(\infty,1)$ -topos of smooth $\infty$ -groupoids

such that the canonical shape modality (the smooth path ∞-groupoid construction) still sees the correct underlying homotopy type of topological spaces (SS20, Ex. 3.18, see also at model structure on Delta-generated topological spaces):

Related concepts

References

General

$\Delta$ -generated spaces were originally proposed by Jeff Smith as a nice category of spaces for homotopy theory.

Jeff Smith, A really convenient category of topological spaces (unpublished and possibly non-existent, according to Dugger 03, p. 4)
Daniel Dugger, Notes on Delta-generated spaces, 2003 (web, pdf)

A proof that the category of $\Delta$ -generated spaces is locally presentable is in:

Lisbeth Fajstrup, Jiří Rosický, Thm. 3.6 of: A convenient category for directed homotopy, Theory and Applications of Categories, Vol. 21, 2008, No. 1, pp 7-20. (arXiv:0708.3937, tac:21-01)

Relation to diffeological spaces

Relation to diffeological spaces:

Kazuhisa Shimakawa, K. Yoshida, Tadayuki Haraguchi, Homology and cohomology via enriched bifunctors, Kyushu Journal of Mathematics, 2018 Volume 72 Issue 2 Pages 239-252 (arXiv:1010.3336, doi:10.2206/kyushujm.72.239)
J. Daniel Christensen, Gord Sinnamon, Enxin Wu, Sec. 3.2 of: The $D$ -topology for diffeological spaces, Pacific Journal of Mathematics 272 (1), 87-110, 2014 (arXiv:1302.2935, doi:10.2140/pjm.2014.272.87)

Last revised on November 4, 2022 at 08:19:58. See the history of this page for a list of all contributions to it.