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In [[mathematics]], a '''metric space aimed at its subspace''' is a [[category theory|categorical]] construction that has a direct geometric meaning.  It is also a useful step toward the construction of the ''metric envelope'', or [[tight span]], which are basic (injective) objects of the category of [[metric space]]s.
 
Following {{harv|Holsztyński|1966}}, a notion of a metric space ''Y'' aimed at its subspace ''X'' is defined.
 
Informally, imagine terrain Y, and its part X, such that wherever in Y you place a sharpshooter, and an apple at another place in Y, and then let the sharpshooter fire, the bullet will go through the apple and will always hit a point of X, or at least it will fly arbitrarily close to points of X – then we say that Y is aimed at X.
 
A priori, it may seem plausible that for a given ''X'' the superspaces ''Y'' that aim at ''X'' can be arbitrarily large or at least huge.  We will see that this is not the case. Among the spaces, which aim at a subspace isometric to ''X'' there is a unique ([[up to]] [[isometry]]) universal one, Aim(''X''), which in a sense of canonical [[isometric embedding]]s contains any other space aimed at (an isometric image of) ''X''. And in the special case of an arbitrary compact metric space ''X'' every bounded subspace of an arbitrary metric space ''Y'' aimed at ''X'' is [[totally bounded]] (i.e. its metric completion is compact).
 
== Definitions ==
Let <math>(Y, d)</math> be a metric space. Let <math>X</math> be a subset of <math>Y</math>, so that <math>(X,d |X^2)</math> (the set <math>X</math> with the metric from <math>Y</math> restricted to <math>X</math>) is a metric subspace of <math>(Y,d)</math>.  Then
 
'''Definition'''.&nbsp; Space <math>Y</math> aims at <math>X</math> if and only if, for all points <math>y, z</math> of <math>Y</math>, and for every real <math>\epsilon > 0</math>, there exists a point <math>p</math> of <math>X</math> such that
 
:<math>|d(p,y) - d(p,z)| > d(y,z) - \epsilon.</math>
 
Let <math>\text{Met}(X)</math> be the space of all real valued [[metric map]]s (non-contractive) of <math>X</math>. Define
 
:<math>\text{Aim}(X) := \{f \in \operatorname{Met}(X) : f(p) + f(q) \ge d(p,q) \text{ for all } p,q\in X\}.</math>
 
Then
 
:<math>d(f,g) := \sup_{x\in X} |f(x)-g(x)| < \infty</math>
 
for every <math>f, g\in \text{Aim}(X)</math> is a metric on <math>\text{Aim}(X)</math>. Furthermore, <math>\delta_X\colon x\mapsto d_x</math>, where <math>d_x(p) := d(x,p)\,</math>, is an isometric embedding of <math>X</math> into <math>\operatorname{Aim}(X)</math>; this is essentially a generalisation of the Kuratowski-Wojdysławski embedding of bounded metric spaces <math>X</math> into <math>C(X)</math>, where we here consider arbitrary metric spaces (bounded or unbounded). It is clear that the space <math>\operatorname{Aim}(X)</math> is aimed at <math>\delta_X(X)</math>.
 
== Properties ==
Let <math>i\colon X \to Y</math> be an isometric embedding. Then there exists a natural metric map <math>j\colon Y \to \operatorname{Aim}(X)</math> such that <math>j \circ i = \delta_X</math>:
 
:::<math>(j(y))(x) := d(x,y)\,</math>
 
for every <math>x\in X\,</math> and <math>y\in Y\,</math>.
 
:'''Theorem''' The space ''Y'' above is aimed at subspace ''X'' if and only if the natural mapping <math>j\colon Y \to \operatorname{Aim}(X)</math> is an isometric embedding.
 
Thus it follows that every space aimed at ''X'' can be isometrically mapped into Aim(X), with some additional (essential) categorical requirements satisfied.
 
The space Aim(X) is [[injective metric space|injective]] (hyperconvex in the sense of [[Aronszajn]]-Panitchpakdi) – given a metric space ''M,'' which contains Aim(X) as a metric subspace, there is a canonical (and explicit) metric retraction of ''M'' onto Aim(X) {{harv|Holsztyński|1966}}.
 
==References==
*{{citation|mr=0196709|last= Holsztyński|first= W.|title= On metric spaces aimed at their subspaces. |journal= Prace Mat.|volume=  10|year=  1966|pages= 95–100}}
 
[[Category:Metric geometry]]

Revision as of 21:52, 23 January 2014

In mathematics, a metric space aimed at its subspace is a categorical construction that has a direct geometric meaning. It is also a useful step toward the construction of the metric envelope, or tight span, which are basic (injective) objects of the category of metric spaces.

Following Template:Harv, a notion of a metric space Y aimed at its subspace X is defined.

Informally, imagine terrain Y, and its part X, such that wherever in Y you place a sharpshooter, and an apple at another place in Y, and then let the sharpshooter fire, the bullet will go through the apple and will always hit a point of X, or at least it will fly arbitrarily close to points of X – then we say that Y is aimed at X.

A priori, it may seem plausible that for a given X the superspaces Y that aim at X can be arbitrarily large or at least huge. We will see that this is not the case. Among the spaces, which aim at a subspace isometric to X there is a unique (up to isometry) universal one, Aim(X), which in a sense of canonical isometric embeddings contains any other space aimed at (an isometric image of) X. And in the special case of an arbitrary compact metric space X every bounded subspace of an arbitrary metric space Y aimed at X is totally bounded (i.e. its metric completion is compact).

Definitions

Let (Y,d) be a metric space. Let X be a subset of Y, so that (X,d|X2) (the set X with the metric from Y restricted to X) is a metric subspace of (Y,d). Then

Definition.  Space Y aims at X if and only if, for all points y,z of Y, and for every real ϵ>0, there exists a point p of X such that

|d(p,y)d(p,z)|>d(y,z)ϵ.

Let Met(X) be the space of all real valued metric maps (non-contractive) of X. Define

Aim(X):={fMet(X):f(p)+f(q)d(p,q) for all p,qX}.

Then

d(f,g):=supxX|f(x)g(x)|<

for every f,gAim(X) is a metric on Aim(X). Furthermore, δX:xdx, where dx(p):=d(x,p), is an isometric embedding of X into Aim(X); this is essentially a generalisation of the Kuratowski-Wojdysławski embedding of bounded metric spaces X into C(X), where we here consider arbitrary metric spaces (bounded or unbounded). It is clear that the space Aim(X) is aimed at δX(X).

Properties

Let i:XY be an isometric embedding. Then there exists a natural metric map j:YAim(X) such that ji=δX:

(j(y))(x):=d(x,y)

for every xX and yY.

Theorem The space Y above is aimed at subspace X if and only if the natural mapping j:YAim(X) is an isometric embedding.

Thus it follows that every space aimed at X can be isometrically mapped into Aim(X), with some additional (essential) categorical requirements satisfied.

The space Aim(X) is injective (hyperconvex in the sense of Aronszajn-Panitchpakdi) – given a metric space M, which contains Aim(X) as a metric subspace, there is a canonical (and explicit) metric retraction of M onto Aim(X) Template:Harv.

References

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