Metric space aimed at its subspace

Definitions

Let ( Y , d ) be a metric space. Let X be a subset of Y , so that ( X , d | X ) (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 ) := { f ∈ Met ⁡ ( X ) : f ( p ) + f ( q ) ≥ d ( p , q )  for all  p , q ∈ X } .

Then

d ( f , g ) := sup x ∈ X | f ( x ) − g ( x ) | < ∞

for every f , g ∈ Aim ( X ) is a metric on Aim ( X ) . Furthermore, δ X : x ↦ d x , where d x ( 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 δ X ( X ) .

Properties

Let i : X → Y be an isometric embedding. Then there exists a natural metric map j : Y → Aim ⁡ ( X ) such that j ∘ i = δ X :

for every x ∈ X and y ∈ Y .

Theorem The space Y above is aimed at subspace X if and only if the natural mapping j : Y → Aim ⁡ ( 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) (Holsztyński 1966).