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Continuous, position-preserving mapping from a topological space into a subspace
In topology, a retraction is a continuous mapping from a topological space into a subspace that preserves the position of all points in that subspace.[1] The subspace is then called a retract of the original space. A deformation retraction is a mapping that captures the idea of continuously shrinking a space into a subspace.
An absolute neighborhood retract (ANR) is a particularly well-behaved type of topological space. For example, every topological manifold is an ANR. Every ANR has the homotopy type of a very simple topological space, a CW complex.
Let X be a topological space and A a subspace of X. Then a continuous map
is a retraction if the restriction of r to A is the identity map on A; that is, r ( a ) = a {\textstyle r(a)=a} for all a in A. Equivalently, denoting by
the inclusion, a retraction is a continuous map r such that
that is, the composition of r with the inclusion is the identity of A. Note that, by definition, a retraction maps X onto A. A subspace A is called a retract of X if such a retraction exists. For instance, any non-empty space retracts to a point in the obvious way (any constant map yields a retraction). If X is Hausdorff, then A must be a closed subset of X.
If r : X → A {\textstyle r:X\to A} is a retraction, then the composition ι∘r is an idempotent continuous map from X to X. Conversely, given any idempotent continuous map s : X → X , {\textstyle s:X\to X,} we obtain a retraction onto the image of s by restricting the codomain.
Deformation retract and strong deformation retract[edit]A continuous map
is a deformation retraction of a space X onto a subspace A if, for every x in X and a in A,
In other words, a deformation retraction is a homotopy between a retraction (strictly, between its composition with the inclusion) and the identity map on X. The subspace A is called a deformation retract of X. A deformation retraction is a special case of a homotopy equivalence.
A retract need not be a deformation retract. For instance, having a single point as a deformation retract of a space X would imply that X is path connected (and in fact that X is contractible).
Note: An equivalent definition of deformation retraction is the following. A continuous map r : X → A {\textstyle r:X\to A} is itself called a deformation retraction if it is a retraction and its composition with the inclusion is homotopic to the identity map on X. In this language, a deformation retraction still carries with it a homotopy between the identity map on X and itself, but we refer to the map r {\textstyle r} rather than the homotopy as a deformation retraction.
If, in the definition of a deformation retraction, we add the requirement that
for all t in [0, 1] and a in A, then F is called a strong deformation retraction. In other words, a strong deformation retraction leaves points in A fixed throughout the homotopy. (Some authors, such as Hatcher, take this as the definition of deformation retraction.)
As an example, the n-sphere S n {\textstyle S^{n}} is a strong deformation retract of R n + 1 ∖ { 0 } ; {\textstyle \mathbb {R} ^{n+1}\backslash \{0\};} as strong deformation retraction one can choose the map
Note that the condition of being a strong deformation retract is strictly stronger than being a deformation retract. For instance, let X be the subspace of R 2 {\displaystyle \mathbb {R} ^{2}} consisting of closed line segments connecting the origin and the point ( 1 / n , 1 ) {\displaystyle (1/n,1)} for n a positive integer, together with the closed line segment connecting the origin with ( 0 , 1 ) {\displaystyle (0,1)} . Let X have the subspace topology inherited from the Euclidean topology on R 2 {\displaystyle \mathbb {R} ^{2}} . Now let A be the subspace of X consisting of the line segment connecting the origin with ( 0 , 1 ) {\displaystyle (0,1)} . Then A is a deformation retract of X but not a strong deformation retract of X.[2]
Cofibration and neighborhood deformation retract[edit]A map f: A → X of topological spaces is a (Hurewicz) cofibration if it has the homotopy extension property for maps to any space. This is one of the central concepts of homotopy theory. A cofibration f is always injective, in fact a homeomorphism to its image.[3] If X is Hausdorff (or a compactly generated weak Hausdorff space), then the image of a cofibration f is closed in X.
Among all closed inclusions, cofibrations can be characterized as follows. The inclusion of a closed subspace A in a space X is a cofibration if and only if A is a neighborhood deformation retract of X, meaning that there is a continuous map u : X → [ 0 , 1 ] {\displaystyle u:X\rightarrow [0,1]} with A = u − 1 ( 0 ) {\textstyle A=u^{-1}\!\left(0\right)} and a homotopy H : X × [ 0 , 1 ] → X {\textstyle H:X\times [0,1]\rightarrow X} such that H ( x , 0 ) = x {\textstyle H(x,0)=x} for all x ∈ X , {\displaystyle x\in X,} H ( a , t ) = a {\displaystyle H(a,t)=a} for all a ∈ A {\displaystyle a\in A} and t ∈ [ 0 , 1 ] , {\displaystyle t\in [0,1],} and H ( x , 1 ) ∈ A {\textstyle H\left(x,1\right)\in A} if u ( x ) < 1 {\displaystyle u(x)<1} .[4]
For example, the inclusion of a subcomplex in a CW complex is a cofibration.
No-retraction theorem[edit]The boundary of the n-dimensional ball, that is, the (n−1)-sphere, is not a retract of the ball. (See Brouwer fixed-point theorem § A proof using homology or cohomology.)
Absolute neighborhood retract (ANR)[edit]A closed subset X {\textstyle X} of a topological space Y {\textstyle Y} is called a neighborhood retract of Y {\textstyle Y} if X {\textstyle X} is a retract of some open subset of Y {\textstyle Y} that contains X {\textstyle X} .
Let C {\displaystyle {\mathcal {C}}} be a class of topological spaces, closed under homeomorphisms and passage to closed subsets. Following Borsuk (starting in 1931), a space X {\textstyle X} is called an absolute retract for the class C {\displaystyle {\mathcal {C}}} , written AR ( C ) , {\textstyle \operatorname {AR} \left({\mathcal {C}}\right),} if X {\textstyle X} is in C {\displaystyle {\mathcal {C}}} and whenever X {\textstyle X} is a closed subset of a space Y {\textstyle Y} in C {\displaystyle {\mathcal {C}}} , X {\textstyle X} is a retract of Y {\textstyle Y} . A space X {\textstyle X} is an absolute neighborhood retract for the class C {\displaystyle {\mathcal {C}}} , written ANR ( C ) , {\textstyle \operatorname {ANR} \left({\mathcal {C}}\right),} if X {\textstyle X} is in C {\displaystyle {\mathcal {C}}} and whenever X {\textstyle X} is a closed subset of a space Y {\textstyle Y} in C {\displaystyle {\mathcal {C}}} , X {\textstyle X} is a neighborhood retract of Y {\textstyle Y} .
Various classes C {\displaystyle {\mathcal {C}}} such as normal spaces have been considered in this definition, but the class M {\displaystyle {\mathcal {M}}} of metrizable spaces has been found to give the most satisfactory theory. For that reason, the notations AR and ANR by themselves are used in this article to mean AR ( M ) {\displaystyle \operatorname {AR} \left({\mathcal {M}}\right)} and ANR ( M ) {\displaystyle \operatorname {ANR} \left({\mathcal {M}}\right)} .[6]
A metrizable space is an AR if and only if it is contractible and an ANR.[7] By Dugundji, every locally convex metrizable topological vector space V {\textstyle V} is an AR; more generally, every nonempty convex subset of such a vector space V {\textstyle V} is an AR.[8] For example, any normed vector space (complete or not) is an AR. More concretely, Euclidean space R n , {\textstyle \mathbb {R} ^{n},} the unit cube I n , {\textstyle I^{n},} and the Hilbert cube I ω {\textstyle I^{\omega }} are ARs.
ANRs form a remarkable class of "well-behaved" topological spaces. Among their properties are:
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