Metric and Hilbert Spaces

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

Last updated: 4 November 2014

Lecture 17: Compactness

Compactness

Let $(X, d)$ be a metric space. Let $A \subseteq X .$

The set $A$ is sequentially compact if every sequence in $A$ has a cluster point in $A .$

The set $A$ is Cauchy compact, or complete, if every Cauchy sequence in $A$ has a cluster point in $A .$

The set $A$ is ball compact if $A$ satisfies if $ε \in ℝ_{> 0}$ then there exists $N \in ℤ_{> 0}$ and $x_{1}, x_{2}, \dots, x_{N} \in X$ such that $A \subseteq B (x_{1}, ε) \cup B (x_{2}, ε) \cup \dots \cup B (x_{N}, ε) .$

The set $A$ is cover compact if $A$ satisfies if $𝒮 \subseteq 𝒯$ and $A \subseteq ⋃_{U \in 𝒮} U$ then there exists $N \in ℤ_{> 0}$ and $U_{1}, U_{2}, \dots, U_{n} \in 𝒮$ such that $A \subseteq U_{1} \cup U_{2} \cup \dots \cup U_{n} .$ (in English: every open cover has a finite subcover).

Synonyms for ball compact are precompact and totally bounded.

Let $(X, d)$ be a metric space and let $A \subseteq X .$

(a)	If $A$ is cover compact then $A$ is sequentially compact.
(b)	If $A$ is sequentially compact then $A$ is cover compact.
(c)	If $A$ is sequentially compact then $A$ is Cauchy compact.
(d)	If $A$ is cover compact then $A$ is ball compact.
(e)	If $A$ is ball compact then $A$ is bounded.
(f)	If $A$ is Cauchy compact then $A$ is closed.

\begin{matrix} cover compact & \overset{(d)}{⟹} & ball compact & \overset{(e)}{⟹} & bounded \\ (a) ⇓ ⇑ (b) \\ sequentially compact & \overset{(c)}{⟹} & Cauchy compact & \overset{(f)}{⟹} & closed \end{matrix}

HW: Let $A = (0, 1) \subseteq ℝ$ with the standard metric on $ℝ .$ Show that $A$ is ball compact and not closed but not cover compact (and not Cauchy compact).

HW: Let $X = ℝ$ with metric given by $d (x, y) = min {∣ x - y ∣, 1} .$ Show that $X$ is bounded but not ball compact.

HW: Let $A = ℝ_{(0, 1)}$ with metric $d (x, y) = ∣ x - y ∣ .$ Show that $A$ is closed but $A$ is not Cauchy compact.

HW: Show that $ℝ$ with the standard metric is Cauchy compact and not bounded but not cover compact (and not ball compact).

Let $(X, d)$ be a metric space and let $A \subseteq X .$ If $A$ is ball compact and Cauchy compact then $A$ is cover compact.

Let $A \subseteq ℝ^{n}$ with the standard metric on $ℝ^{n} .$ If $A$ is closed and bounded then $A$ is cover compact.

Proof.

Assume $A \subseteq ℝ^{n}$ and $A$ is closed and bounded.

(a)	Since $ℝ^{n}$ is complete, $A \subseteq ℝ^{n}$ and $A$ is closed then $A$ is complete. So $A$ is Cauchy compact.
(b)	Since $A \subseteq ℝ^{n}$ and $A$ is bounded then $A$ is ball compact. Since $A$ is Cauchy compact and ball compact. So $A$ is cover compact. (Note: (b) follows since $A \subseteq B (0, c)$ for some $c \in ℝ_{> 0}$ and $B (0, c)$ is ball compact in $ℝ^{n}$ (since $B (0, c)$ has finite volume).)

$□$

HW: Show that a closed subset of a Cauchy compact set is Cauchy compact.

HW: Show that a bounded subset of a ball compact set is ball compact.

HW: Show that a closed subset of a cover compact set is cover compact.

$ℓ^{2} = {\overset{⇀}{x} = (x_{1}, x_{2}, \dots) | x_{i} \in ℝ with {‖ \overset{⇀}{x} ‖}_{2} < \infty}$ where ${‖ \overset{⇀}{x} ‖}_{2} = {(\sum_{i \in ℤ_{> 0}} x_{i}^{2})}^{\frac{1}{2}} for \overset{⇀}{x} = (x_{1}, x_{2}, \dots) .$ Then let $\begin{array}{rcl} e_{1} & = & (1, 0, 0, \dots), \\ e_{2} & = & (0, 1, 0, \dots), \\ e_{3} & = & (0, 0, 1, 0, \dots), \\ ⋮ \end{array}$ Then $e_{1}, e_{2}, e_{3}, \dots$ is a sequence in $ℓ^{2}$ ${e_{1}, e_{2}, e_{3}, \dots}$ is bounded since $d (e_{i}, e_{j}) = \sqrt{1 + 1} = \sqrt{2} .$ The set ${e_{1}, e_{2}, e_{3}, \dots}$ is not ball compact.

Notes and References

These are a typed copy of Lecture 17 from a series of handwritten lecture notes for the class Metric and Hilbert Spaces given on August 26, 2014.

page history