Uniform spaces

Arun Ram
Department of Mathematics and Statistics
University of Melbourne
Parkville, VIC 3010 Australia
aram@unimelb.edu.au

Last update: 23 July 2014

Uniform spaces

A uniform space is a set $X$ with a collection $𝒳$ of subsets of $X \times X$ such that

(a)	if $V \subseteq X \times X$ and $B \in 𝒳$ and $B \subseteq V$ then $V \in 𝒳,$
(b)	if $ℓ \in ℤ_{> 0}$ and $V_{1}, V_{2}, \dots, V_{ℓ} \in 𝒳$ then $V_{1} \cap V_{2} \cap \dots \cap V_{ℓ} \in 𝒳,$
(c)	if $V \in 𝒳$ then ${(x, x) \| x \in X} \subseteq V,$
(d)	if $V \in 𝒳$ then ${(y, x) \| (x, y) \in V} \in 𝒳,$
(e)	if $V \in 𝒳$ then there exists $M \in 𝒳$ such that $M \times_{X} M \subseteq V$ where $M \times_{X} M = {(x, y) \| there exists z \in X such that (x, z) \in M and (z, y) \in M} .$

Let $(X, 𝒳)$ be a uniform space. An entourage is a set in $𝒳 .$

Uniformly continuous functions are for comparing uniform spaces.

Let $(X, 𝒳)$ and $(Y, 𝒴)$ be uniform spaces. A uniformly continuous function from $X$ to $Y$ is a function $f : X \to Y$ such that if $W \in 𝒴$ then there exists $V \in 𝒳$ such that if $(x, y) \in V$ then $(f (x), f (y)) \in W .$

Let $(X, 𝒳)$ be a uniform space. The uniform space topology on $X$ is the topology on $X$ such that if $x \in X$ then $𝒩 (x) = {B_{V} (x) = {y \in X | (x, y) \in V} | V \in 𝒳}$ is the neighbourhood filter of $x .$

Homework: Let $(X, 𝒳)$ and $(Y, 𝒴)$ be uniform spaces and let $f : X \to Y$ be a uniformly continuous function. Show that $f : X \to Y$ is continuous (with respect to the uniform space topology on $X$ and $Y).$

Cauchy filters and Cauchy sequences

Let $(X, 𝒳)$ be a uniform space.

A Cauchy filter is a filter $ℱ$ on $X$ such that if $V \in 𝒳$ then there exists $N \in ℱ$ such that $N \times N \subseteq V .$

A Cauchy sequence is a sequence $x_{1}, x_{2}, \dots$ in $X$ such that if $V \in 𝒳$ then there exists $n_{0} \in ℤ_{> 0}$ such that if $m, n \in ℤ_{> 0}$ and $m > n_{0}$ and $n > n_{0}$ then $(x_{m}, x_{n}) \in V .$

Homework: Let $(X, 𝒳)$ be a uniform space and let $x_{1}, x_{2}, \dots$ be a sequence in $X .$ Let $ℱ$ be the filter consisting of all subsets of $X$ which contain all but a finite number of points of ${x_{1}, x_{2}, \dots} .$ Show that $ℱ$ is a Cauchy filter if and only if $x_{1}, x_{2}, \dots$ is a Cauchy sequence.

Homework: Let $(X, 𝒳)$ be a uniform space and let $ℱ$ be a filter on $X .$ Show that if $ℱ$ is convergent then $ℱ$ is Cauchy.

Homework: Let $(X, 𝒳)$ be a uniform space and let $x_{1}, x_{2}, x_{3}, \dots$ be a sequence in $X .$ Show that if $x_{1}, x_{2}, \dots$ is convergent then $x_{1}, x_{2}, \dots$ is a Cauchy sequence.

Homework: Give an example of a Cauchy sequence that does not converge.

Homework: Give an example of a Cauchy filter that does not have a limit point.

A complete space is a uniform space $(X, 𝒳)$ such that if $ℱ$ is a Cauchy filter on $X$ then $ℱ$ has a limit point.

Homework: Let $(X, 𝒳)$ be a complete space and let $Y \subseteq X .$ Show that if $Y$ is closed then $Y$ is complete.

Homework: Let $(X, 𝒳)$ be a Hausdorff uniform space and let $Y \subseteq X .$ Show that if $Y$ is complete then $Y$ is closed.

Homework: Let ${(X_{i}, 𝒳_{i}) | i \in I}$ be a collection of uniform spaces. Show that $\prod_{i \in I} X_{i}$ is complete if and only if the collection ${(X_{i}, 𝒳_{i}) | i \in I}$ satisfies if $i \in I$ then $X_{i}$ is complete.

Completions of uniform spaces

Let $(X, 𝒳)$ be a uniform space.

A minimal Cauchy filter on $X$ is a Cauchy filter $ℱ$ on $X$ such that if $𝒢$ is a Cauchy filter on $X$ and $𝒢 \subseteq ℱ$ then $𝒢 = ℱ .$

The completion of $X$ is the set $\hat{X} = {minimal Cauchy filters \hat{x} on X}$ with uniform structure $\hat{𝒳}$ generated by the sets $\hat{V} = {(\hat{x}, \hat{y}) \in \hat{X} \times \hat{X} | there exists N \in \hat{x} \cap \hat{y} such that N \times N \subseteq V}$ for $V \in 𝒳$ such that if $(x, y) \in V$ then $(y, x) \in V$ and with the uniformly continuous map $i : X ⟶ \hat{X} given by i (x) = 𝒩 (x),$ where $𝒩 (x)$ is the neighbourhood filter of $x .$

Homework: Show that the sets $\hat{V}$ for $V \in 𝒳$ such that if $(x, y) \in V$ then $(y, x) \in V$ generate a uniform structure on $\hat{X} .$

Homework: Show that $\hat{X}$ is Hausdorff.

Homework: Show that the uniform structure on $X$ is the inverse image of the uniform structure on $\hat{X}$ under $i : X \to \hat{X} .$

Homework: Show that $i : X \to \hat{X}$ is uniformly continuous.

Homework: Show that $\hat{X}$ is complete.

Homework: Show that $i (X)$ is dense in $\hat{X} .$

Homework: Show that if $Y$ is a complete Hausdorff uniform space and if $f : X \to Y$ is a uniformly continuous function then there exists a unique uniformly continuous function $g : \hat{X} \to Y$ such that $g \circ i = f$ $\begin{matrix} X & \overset{f}{⟶} & Y \\ i ↘ & ↗ g \\ \hat{X} \end{matrix}$

Notes and References

These are a typed copy of handwritten notes from the pdf 140721UniformSpacesscanned140721.pdf.

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