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In algebraic topology, the path space fibration over a pointed space $(X,*)$ ^[1] is a fibration of the form^[2]

\Omega X\hookrightarrow PX{\overset {\chi \mapsto \chi (1)}{\to }}X

where

$PX$ is the based path space of the pointed space $(X,*)$ ; that is, $PX=\{f\colon I\to X\mid f\ {\text{continuous}},f(0)=*\}$ equipped with the compact-open topology.
$\Omega X$ is the fiber of $\chi \mapsto \chi (1)$ over the base point of $(X,*)$ ; thus it is the loop space of $(X,*)$ .

The free path space of X, that is, $\operatorname {Map} (I,X)=X^{I}$ , consists of all maps from I to X that do not necessarily begin at a base point, and the fibration $X^{I}\to X$ given by, say, $\chi \mapsto \chi (1)$ , is called the free path space fibration.

The path space fibration can be understood to be dual to the mapping cone.^{[clarification needed]} The fiber of the based fibration is called the mapping fiber or, equivalently, the homotopy fiber.

Mapping path space

If $f\colon X\to Y$ is any map, then the mapping path space $P_{f}$ of $f$ is the pullback of the fibration $Y^{I}\to Y,\,\chi \mapsto \chi (1)$ along $f$ . (A mapping path space satisfies the universal property that is dual to that of a mapping cylinder, which is a push-out. Because of this, a mapping path space is also called a mapping cocylinder.^[3])

Since a fibration pulls back to a fibration, if Y is based, one has the fibration

F_{f}\hookrightarrow P_{f}{\overset {p}{\to }}Y

where $p(x,\chi )=\chi (0)$ and $F_{f}$ is the homotopy fiber, the pullback of the fibration $PY{\overset {\chi \mapsto \chi (1)}{\longrightarrow }}Y$ along $f$ .

Note also $f$ is the composition

X{\overset {\phi }{\to }}P_{f}{\overset {p}{\to }}Y

where the first map $\phi$ sends x to $(x,c_{f(x)})$ ; here $c_{f(x)}$ denotes the constant path with value $f(x)$ . Clearly, $\phi$ is a homotopy equivalence; thus, the above decomposition says that any map is a fibration up to homotopy equivalence.

If $f$ is a fibration to begin with, then the map $\phi \colon X\to P_{f}$ is a fiber-homotopy equivalence and, consequently,^[4] the fibers of $f$ over the path-component of the base point are homotopy equivalent to the homotopy fiber $F_{f}$ of $f$ .

Moore's path space

By definition, a path in a space X is a map from the unit interval I to X. Again by definition, the product of two paths $\alpha ,\beta$ such that $\alpha (1)=\beta (0)$ is the path $\beta \cdot \alpha \colon I\to X$ given by:

(\beta \cdot \alpha )(t)={\begin{cases}\alpha (2t)&{\text{if }}0\leq t\leq 1/2\\\beta (2t-1)&{\text{if }}1/2\leq t\leq 1\\\end{cases}}

.

This product, in general, fails to be associative on the nose: $(\gamma \cdot \beta )\cdot \alpha \neq \gamma \cdot (\beta \cdot \alpha )$ , as seen directly. One solution to this failure is to pass to homotopy classes: one has $[(\gamma \cdot \beta )\cdot \alpha ]=[\gamma \cdot (\beta \cdot \alpha )]$ . Another solution is to work with paths of arbitrary lengths, leading to the notions of Moore's path space and Moore's path space fibration, described below.^[5] (A more sophisticated solution is to rethink composition: work with an arbitrary family of compositions; see the introduction of Lurie's paper,^[6] leading to the notion of an operad.)

Given a based space $(X,*)$ , we let

P'X=\{f\colon [0,r]\to X\mid r\geq 0,f(0)=*\}.

An element f of this set has a unique extension ${\widetilde {f}}$ to the interval $[0,\infty )$ such that ${\widetilde {f}}(t)=f(r),\,t\geq r$ . Thus, the set can be identified as a subspace of $\operatorname {Map} ([0,\infty ),X)$ . The resulting space is called the Moore path space of X, after John Coleman Moore, who introduced the concept. Then, just as before, there is a fibration, Moore's path space fibration:

\Omega 'X\hookrightarrow P'X{\overset {p}{\to }}X

where p sends each $f:[0,r]\to X$ to $f(r)$ and $\Omega 'X=p^{-1}(*)$ is the fiber. It turns out that $\Omega X$ and $\Omega 'X$ are homotopy equivalent.

Now, we define the product map

\mu :P'X\times \Omega 'X\to P'X

by: for $f\colon [0,r]\to X$ and $g\colon [0,s]\to X$ ,

\mu (g,f)(t)={\begin{cases}f(t)&{\text{if }}0\leq t\leq r\\g(t-r)&{\text{if }}r\leq t\leq s+r\\\end{cases}}

.

This product is manifestly associative. In particular, with μ restricted to Ω'X × Ω'X, we have that Ω'X is a topological monoid (in the category of all spaces). Moreover, this monoid Ω'X acts on P'X through the original μ. In fact, $p:P'X\to X$ is an Ω'X-fibration.^[7]

Notes

^ Throughout the article, spaces are objects of the category of "reasonable" spaces; e.g., the category of compactly generated weak Hausdorff spaces.
^ Davis & Kirk 2001, Theorem 6.15. 2.
^ Davis & Kirk 2001, § 6.8.
^ using the change of fiber
^ Whitehead 1978, Ch. III, § 2.
^ Lurie, Jacob (October 30, 2009). "Derived Algebraic Geometry VI: E[k]-Algebras" (PDF).
^
Let G = Ω'X and P = P'X. That G preserves the fibers is clear. To see, for each γ in P, the map $G\to p^{-1}(p(\gamma )),\,g\mapsto \gamma g$ $G\to p^{-1}(p(\gamma )),\,g\mapsto \gamma g$ is a weak equivalence, we can use the following lemma:
Lemma — Let p: D → B, q: E → B be fibrations over an unbased space B, f: D → E a map over B. If B is path-connected, then the following are equivalent:
- f is a weak equivalence.
- $f:p^{-1}(b)\to q^{-1}(b)$ is a weak equivalence for some b in B.
- $f:p^{-1}(b)\to q^{-1}(b)$ is a weak equivalence for every b in B.
We apply the lemma with $B=I,D=I\times G,E=I\times _{X}P,f(t,g)=(t,\alpha (t)g)$ where α is a path in P and I → X is t → the end-point of α(t). Since $p^{-1}(p(\gamma ))=G$ if γ is the constant path, the claim follows from the lemma. (In a nutshell, the lemma follows from the long exact homotopy sequence and the five lemma.)

References

Davis, James F.; Kirk, Paul (2001). Lecture Notes in Algebraic Topology (PDF). Graduate Studies in Mathematics. Vol. 35. Providence, RI: American Mathematical Society. pp. xvi+367. doi:10.1090/gsm/035. ISBN 0-8218-2160-1. MR 1841974.
May, J. Peter (1999). A Concise Course in Algebraic Topology (PDF). Chicago Lectures in Mathematics. Chicago, IL: University of Chicago Press. pp. x+243. ISBN 0-226-51182-0. MR 1702278.
Whitehead, George W. (1978). Elements of homotopy theory. Graduate Texts in Mathematics. Vol. 61 (3rd ed.). New York-Berlin: Springer-Verlag. pp. xxi+744. ISBN 978-0-387-90336-1. MR 0516508.

[1] Throughout the article, spaces are objects of the category of "reasonable" spaces; e.g., the category of compactly generated weak Hausdorff spaces.

[2] Davis & Kirk 2001, Theorem 6.15. 2.

[3] Davis & Kirk 2001, § 6.8.

[4] using the change of fiber

[5] Whitehead 1978, Ch. III, § 2.

[6] Lurie, Jacob (October 30, 2009). "Derived Algebraic Geometry VI: E[k]-Algebras" (PDF).

[7] Let G = Ω'X and P = P'X. That G preserves the fibers is clear. To see, for each γ in P, the map $G\to p^{-1}(p(\gamma )),\,g\mapsto \gamma g$ is a weak equivalence, we can use the following lemma:

Lemma — Let p: D → B, q: E → B be fibrations over an unbased space B, f: D → E a map over B. If B is path-connected, then the following are equivalent:

f is a weak equivalence.

$f:p^{-1}(b)\to q^{-1}(b)$ is a weak equivalence for some b in B.

$f:p^{-1}(b)\to q^{-1}(b)$ is a weak equivalence for every b in B.

We apply the lemma with $B=I,D=I\times G,E=I\times _{X}P,f(t,g)=(t,\alpha (t)g)$ where α is a path in P and I → X is t → the end-point of α(t). Since $p^{-1}(p(\gamma ))=G$ if γ is the constant path, the claim follows from the lemma. (In a nutshell, the lemma follows from the long exact homotopy sequence and the five lemma.)

[8] s a weak equivalence.

[9] $f:p^{-1}(b)\to q^{-1}(b)$ is a weak equivalence for some b in B.

[10] $f:p^{-1}(b)\to q^{-1}(b)$ is a weak equivalence for every b in B.

[1]

[2]

[3]

[4]

[5]

[6]

[7]

@@ Line 1: / Line 1: @@
-In algebraic topology, the '''path space fibration''' over a based space (''X'', *) is a [[fibration]] of the form
+In [[algebraic topology]], the '''path space fibration''' over a [[pointed space]] <math>(X, *)</math><ref>Throughout the article, spaces are objects of the category of "reasonable" spaces; e.g., the category of compactly generated weak [[Hausdorff space]]s.</ref> is a [[fibration]] of the form<ref>{{harvnb|Davis|Kirk|2001|loc=Theorem 6.15. 2.}}</ref>
 :<math>\Omega X \hookrightarrow PX \overset{\chi \mapsto \chi(1)}\to X</math>
 where
+*<math>PX</math> is the ''based'' [[path space (algebraic topology)|path space]] of the pointed space <math>(X, *)</math>;  that is, <math>PX = \{ f\colon I \to X \mid f \ \text{continuous}, f(0) = * \}</math> equipped with the [[compact-open topology]].
-*<math>PX = \operatorname{Map}(I, X) = \{ f: I \to X | f(0) = * \}</math> is the space of all based maps from ''I'' to ''X'', with the unit interval ''I'' given the base point 0. (It is called the path space of ''X''.)
-*<math>\Omega X</math> is the fiber of <math>\chi \mapsto \chi(1)</math> over the base point of ''X''; thus it is the [[loop space]] of ''X''.
+*<math>\Omega X</math> is the fiber of <math>\chi \mapsto \chi(1)</math> over the base point of <math>(X, *)</math>; thus it is the [[loop space]] of <math>(X, *)</math>.
-The space <math>X^I</math> consists of all maps from ''I'' to ''X'' that may not preserve the base points; it is called the '''free path space''' of ''X'' and the fibration <math>X^I \to X</math> given by, say, <math>\chi \mapsto \chi(1)</math>, is called the '''free path space fibration'''.
+The ''free'' path space of ''X'', that is, <math>\operatorname{Map}(I, X) = X^I</math>, consists of all maps from ''I'' to ''X'' that do not necessarily begin at a base point, and the fibration <math>X^I \to X</math> given by, say, <math>\chi \mapsto \chi(1)</math>, is called the '''free path space fibration'''.
+The path space fibration can be understood to be dual to the [[mapping cone (topology)|mapping cone]].{{clarify|more precise meaning|date=August 2022}} The fiber of the based fibration is called the mapping fiber or, equivalently, the [[homotopy fiber]].
 == Mapping path space ==
-If ƒ:''X''→''Y'' is any map, then the '''mapping path space''' ''P''<sub>ƒ</sub> of ƒ is the pullback of <math>Y^I \to Y, \, \chi \mapsto \chi(1)</math> along ƒ. Since a fibration pullbacks to a fibration, one has the fibration
+If <math>f\colon X\to Y</math> is any map, then the '''mapping path space''' <math>P_f</math> of <math>f</math> is the pullback of the fibration <math>Y^I \to Y, \, \chi \mapsto \chi(1)</math> along <math>f</math>. (A mapping path space satisfies the universal property that is dual to that of a mapping cylinder, which is a push-out. Because of this, a mapping path space is also called a '''mapping cocylinder'''.<ref>{{harvnb|Davis|Kirk|2001|loc=§ 6.8.}}</ref>)
+Since a fibration pulls back to a fibration, if ''Y'' is based, one has the fibration
 :<math>F_f \hookrightarrow P_f \overset{p}\to Y</math>
-where <math>p(x, \chi) = \chi(0)</math> and <math>F_f</math> is the [[homotopy fiber]], the pullback of <math>PY \overset{\chi \mapsto \chi(1)}\to Y</math> along ƒ.
+where <math>p(x, \chi) = \chi(0)</math> and <math>F_f</math> is the [[homotopy fiber]], the pullback of the fibration <math>PY \overset{\chi \mapsto \chi(1)}{\longrightarrow} Y</math> along <math>f</math>.
-Note also ƒ is the composition
+Note also <math>f</math> is the composition
 :<math>X \overset{\phi}\to P_f \overset{p}\to Y</math>
-where the first map φ sends ''x'' to <math>(x, c_{f(x)})</math>, <math>c_{f(x)}</math> the constant path with value ƒ(''x''). Clearly, φ is a homotopy equivalence; thus, the above decomposition says that any map is a fibration up to homotopy equivalence.
+where the first map <math>\phi</math> sends ''x'' to <math>(x, c_{f(x)})</math>; here <math>c_{f(x)}</math> denotes the constant path with value <math>f(x)</math>. Clearly, <math>\phi</math> is a [[homotopy equivalence]]; thus, the above decomposition says that any map is a fibration up to homotopy equivalence.
-If ƒ is a fibration to begin with, then <math>\phi: X \to P_f</math> is a [[fiber-homotopy equivalence]] and, consequently,<ref>using the [[change of fiber]]</ref> the fibers of ''f'' over the path-component of the base point are homotopy equivalent to the homotopy fiber <math>F_f</math> of ƒ.
+If <math>f</math> is a fibration to begin with, then the map <math>\phi\colon X \to P_f</math> is a [[fiber-homotopy equivalence]] and, consequently,<ref>using the [[change of fiber]]</ref> the fibers of <math>f</math> over the path-component of the base point are homotopy equivalent to the homotopy fiber <math>F_f</math> of <math>f</math>.
 == Moore's path space ==
-By definition, a path in a space ''X'' is a map from the unit interval ''I'' to ''X''. Again by definition, the product of two paths ''α'', ''β'' such that ''α''(1) = ''β''(0) is the path {{nowrap|''β'' · ''α'': ''I'' → ''X''}} given by:
+By definition, a path in a space ''X'' is a map from the [[unit interval]] ''I'' to ''X''. Again by definition, the product of two paths <math>\alpha, \beta</math> such that <math>\alpha(1) = \beta(0)</math> is the path <math>\beta \cdot \alpha\colon I \to X</math> given by:
 :<math>(\beta \cdot \alpha)(t)=
 \begin{cases}
@@ Line 25: / Line 29: @@
 \beta(2t-1) & \text{if } 1/2 \le t \le 1 \\
 \end{cases}</math>.
-This product, in general, fails to be associative on the nose: (''γ'' · ''β'') · ''α'' ≠ ''γ'' · (''β'' · ''α''), as seen directly. One solution to this failure is to pass to homotopy classes: one has {{nowrap|[(''γ'' · ''β'') · ''α'' ] <nowiki>=</nowiki> [''γ'' · (''β'' · ''α'')].}} Another solution is to work with paths of varying length, leading to the notion of Moore's path space and Moore's path space fibration.<ref>{{harvnb|Whitehead|1979|loc=Ch. III, § 2.}}</ref>
+This product, in general, fails to be [[associative]] on the nose: <math>(\gamma \cdot \beta) \cdot \alpha \ne \gamma \cdot (\beta \cdot \alpha)</math>, as seen directly. One solution to this failure is to pass to [[homotopy]] classes: one has <math>[(\gamma \cdot \beta) \cdot \alpha] = [\gamma \cdot (\beta \cdot \alpha)]</math>. Another solution is to work with paths of arbitrary lengths, leading to the notions of Moore's path space and Moore's path space fibration, described below.<ref>{{harvnb|Whitehead|1978|loc=Ch. III, § 2.}}</ref> (A more sophisticated solution is to ''rethink'' composition: work with an arbitrary family of compositions; see the introduction of Lurie's paper,<ref>{{cite web|first=Jacob|last=Lurie|authorlink=Jacob Lurie|url=http://www.math.harvard.edu/~lurie/papers/DAG-VI.pdf|title=Derived Algebraic Geometry VI: E[k]-Algebras|date=October 30, 2009}}</ref> leading to the notion of an [[operad]].)
-Given a based space (''X'', *), we let
+Given a based space <math>(X, *)</math>, we let
-:<math>P' X = \{ f: [0, r] \to X | f(0) = * \}.</math>
+:<math>P' X = \{ f\colon [0, r] \to X \mid r \ge 0, f(0) = * \}.</math>
-An element ''f'' of this set has the unique extension <math>\widetilde{f}</math> to the interval <math>[0, \infty)</math> such that <math>\widetilde{f}(t) = f(r),\, t \ge r</math>. Thus, the set can be identified as a subspace of <math>\operatorname{Map}([0, \infty), X)</math>. The resulting space is called '''Moore's path space''' of ''X''. Then, just as before, there is a fibration, '''Moore's path space fibration''':
+An element ''f'' of this set has a unique extension <math>\widetilde{f}</math> to the [[interval (mathematics)|interval]] <math>[0, \infty)</math> such that <math>\widetilde{f}(t) = f(r),\, t \ge r</math>. Thus, the set can be identified as a subspace of <math>\operatorname{Map}([0, \infty), X)</math>. The resulting space is called the '''Moore path space''' of ''X'', after [[John Coleman Moore]], who introduced the concept. Then, just as before, there is a fibration, '''Moore's path space fibration''':
 :<math>\Omega' X \hookrightarrow P'X \overset{p}\to X</math>
-where ''p'' sends each ''f'': [0, ''r''] → ''X'' to ''f''(''r'') and <math>\Omega' X = p^{-1}(*)</math> is the fiber. It turns out that <math>\Omega X</math> and <math>\Omega' X</math> are homotopy equivalent.
+where ''p'' sends each <math>f: [0, r] \to X</math> to <math>f(r)</math> and <math>\Omega' X = p^{-1}(*)</math> is the fiber. It turns out that <math>\Omega X</math> and <math>\Omega' X</math> are homotopy equivalent.
+Now, we define the product map
+:<math>\mu: P' X \times \Omega' X \to P' X</math>
+by: for <math>f\colon [0, r] \to X</math> and <math>g\colon [0, s] \to X</math>,
+:<math>\mu(g, f)(t)=
+\begin{cases}
+f(t) & \text{if } 0 \le t \le r \\
+g(t-r) & \text{if } r \le t \le s + r \\
+\end{cases}</math>.
+This product is manifestly associative. In particular, with ''μ'' restricted to Ω{{'}}''X'' × Ω{{'}}''X'', we have that Ω{{'}}''X'' is a [[topological monoid]] (in the [[category (mathematics)|category]] of all spaces). Moreover, this monoid Ω{{'}}''X'' [[monoid action|act]]s on ''P''{{'}}''X'' through the original ''μ''. In fact, <math>p: P'X \to X</math> is an [[G-fibration|Ω<nowiki>'</nowiki>''X''-fibration]].<ref>Let ''G'' = Ω{{'}}''X'' and ''P'' = ''P''{{'}}''X''. That ''G'' preserves the fibers is clear. To see, for each ''γ'' in ''P'', the map <math>G \to p^{-1}(p(\gamma)),\, g \mapsto \gamma g</math> is a weak equivalence, we can use the following lemma:
+{{math_theorem|name=Lemma|math_statement=Let ''p'': ''D'' → ''B'', ''q'': ''E'' → ''B'' be fibrations over an unbased space ''B'', ''f'': ''D'' → ''E'' a map over ''B''. If ''B'' is path-connected, then the following are equivalent:
+*''f'' is a weak equivalence.
+*<math>f: p^{-1}(b) \to q^{-1}(b)</math> is a weak equivalence for some ''b'' in ''B''.
+*<math>f: p^{-1}(b) \to q^{-1}(b)</math> is a weak equivalence for every ''b'' in ''B''.}}
+We apply the lemma with <math>B = I, D = I \times G, E = I \times_X P, f(t, g) = (t, \alpha(t) g)</math> where ''α'' is a path in ''P'' and ''I'' → ''X'' is ''t'' → the end-point of ''α''(''t''). Since <math>p^{-1}(p(\gamma)) = G</math> if ''γ'' is the constant path, the claim follows from the lemma. (In a nutshell, the lemma follows from the [[long exact homotopy sequence]] and the five lemma.)</ref>
 == Notes ==
@@ Line 37: / Line 56: @@
 == References ==
-*James F. Davis, Paul Kirk, [http://www.maths.ed.ac.uk/~aar/papers/davkir.pdf Lecture Notes in Algebraic Topology]
+*{{cite book|first1=James F. |last1=Davis|first2= Paul|last2= Kirk|url=http://www.maths.ed.ac.uk/~aar/papers/davkir.pdf|title= Lecture Notes in Algebraic Topology|series=Graduate Studies in Mathematics|volume= 35|publisher=[[American Mathematical Society]]|location= Providence, RI|year= 2001|pages= xvi+367|isbn=0-8218-2160-1 |mr=1841974|doi=10.1090/gsm/035}}
-*May, J. [http://www.math.uchicago.edu/~may/CONCISE/ConciseRevised.pdf A Concise Course in Algebraic Topology]
+*{{cite book|last=May|first=J. Peter|authorlink=J. Peter May| url=http://www.math.uchicago.edu/~may/CONCISE/ConciseRevised.pdf |title=A Concise Course in Algebraic Topology|series=Chicago Lectures in Mathematics|publisher= [[University of Chicago Press]]|location= Chicago, IL|year= 1999|pages= x+243|isbn=0-226-51182-0|mr=1702278}}
-*{{cite book|author=George William Whitehead|authorlink=George W. Whitehead|title=Elements of homotopy theory|url=http://books.google.com/books?id=wlrvAAAAMAAJ|accessdate=September 6, 2011|edition=3rd|series=Graduate Texts in Mathematics|volume=61|year=1978|publisher=Springer-Verlag|location=New York-Berlin|isbn=978-0-387-90336-1|pages=xxi+744|mr=0516508 }}
+*{{cite book|first=George W.|last= Whitehead|authorlink=George W. Whitehead|title=Elements of homotopy theory|url=https://books.google.com/books?id=wlrvAAAAMAAJ|edition=3rd|series=[[Graduate Texts in Mathematics]]|volume=61|year=1978|publisher=[[Springer Science+Business Media|Springer-Verlag]]|location=New York-Berlin|isbn=978-0-387-90336-1|pages=xxi+744|mr=0516508 }}
-{{topology-stub}}
+[[Category:Algebraic topology]]
+[[Category:Homotopy theory]]