General Topology/Metric spaces

Template:Definition

Template:Definition

Template:Definition

Template:Definition

This definition is justified:

Template:Proposition

Template:Remark

Template:Proof

Now subsets of metric spaces are again metric spaces (as can be easily verified), and the topology induced by the restriction of the metric of the larger space is the subspace topology:

Template:Proposition

Template:Proof

Template:Proposition

Template:Proof

As usual, by choosing ${\displaystyle {\delta }_x}$, ${\displaystyle {\delta }_y}$ maximal by choosing the union of all the open balls satisfying the condition, one may avoid the axiom of choice.

Template:Proposition

Template:Proof

Template:Definition

Template:Proposition

Template:Proof

Template:Proposition

Template:Proof

Template:Proposition

Template:Proof

Template:Proposition

Template:AnchorTemplate:TextBox

Template:Definition

Template:Proposition

Template:Proof

1. Let ${\displaystyle M}$ be a compact topological space, whose topology is induced by two metrics ${\displaystyle d}$ and ${\displaystyle d^{\prime }}$. Prove that for every ${\displaystyle ϵ>0}$, there exists ${\displaystyle \delta >0}$ such that ${\displaystyle d(x,y)<\delta }$ implies ${\displaystyle d^{\prime }(x,y)<ϵ}$ (and then by symmetry also the other way round).