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 46: Convergence

§1 Limit points and cluster points.

§1.1 Filters, nets and sequences.

A directed set is a set $P$ with a relation $\leq$ such that

(a)	If $i \in P$ then $i \leq i,$
(b)	If $i, j, k \in P$ and $i \leq j$ and $j \leq k$ then $i \leq k,$
(c)	If $i, j \in P$ then there exists $k \in P$ such that $i \leq k$ and $j \leq k .$

The favourite example of a directed set if

ℤ_{> 0}

with

i \leq j

if there exists

n \in ℤ_{\geq 0}

with

i + n = j .

Let $X$ be a set.

•

A filter on

X

is a collection

ℱ

of subsets of

X

such that

(a)	(upper ideal) if $N \in ℱ$ and $E$ is a subset of $X$ with $N \subseteq E$ then $E \in ℱ,$
(b)	(closed under finite intersection) If $ℓ \in ℤ_{> 0}$ and $N_{1}, N_{2}, \dots, N_{ℓ}$ in $ℱ$ then $N_{1} \cap N_{2} \cap \dots \cap N_{ℓ} \in ℱ,$
(c)	$\emptyset \notin ℱ .$

•

An ultrafilter is a maximal filter

ℱ

X

(with respect to inclusion).

•

A net in

X

is a function

\begin{matrix} \overset{⇀}{x} : & P & ⟶ & X \\ n & ⟼ & x_{n} \end{matrix}

where

P

is a directed set.

•

A sequence in $X$ is a function

\begin{matrix} \overset{⇀}{x} : & ℤ_{> 0} & ⟶ & X \\ n & ⟼ & x_{n} \end{matrix} .

We often write

\overset{⇀}{x} = (x_{1}, x_{2}, \dots)

for a sequence in

X .

Let $P$ be a directed set. The tail filter is the filter on $P$ given by ${P_{\geq N} | N \in P},$ where $P_{\geq N} = {j \in P | j \geq N} .$

Let $Y$ be a topological space and let $y \in Y .$ The neighbourhood filter of $y$ is the filter on $Y$ generated by the open sets containing $y .$

Let $Y$ be a topological space and let $y \in Y .$

$•$	A neighbourhood of $y$ is a subset $N \subseteq Y$ such that there exists an open set $U \subseteq Y$ with $y \in U \subseteq N .$
$•$	The neighbourhood filter of $y$ is $𝒩 (y) = {neighbourhoods of y} .$

Let $Y$ be a topological space and let $𝒢$ be a filter on $Y .$

$•$	A limit point of $𝒢$ is a point $y \in Y$ such that $𝒢 \supseteq 𝒩 (y) .$
$•$	A cluster point of $𝒢$ is a point $y \in Y$ such that if $N \in 𝒢$ then $y \in \overline{N},$ where $\overline{N}$ is the closure of N.

Let $Y$ be a topological space. Let $X$ be a set and $f : X \to Y$ be a function. Let $ℱ$ be a filter on $X .$

$•$	A limit point of $f$ with respect to $ℱ$ is a limit point of the filter on $Y$ generated by ${f (N) \| N \in ℱ} .$
$•$	A cluster point of $f$ with respect to $ℱ$ is a cluster point of the filter on $Y$ generated by ${f (N) \| N \in ℱ} .$

Write

y = lim_{ℱ} f

y

is a limit point of

f

with respect to

ℱ .

Let $X$ and $Y$ be topological spaces and let $f : X \to Y$ be a function. Let $a \in X .$ Write $y = lim_{x \to a} f (x)$ if $y$ is a limit point of $f$ with respect to the neighbourhood filter of $a .$

Let $\begin{matrix} \overset{⇀}{x} : & P & ⟶ & X \\ n & ⟼ & x_{n} \end{matrix}$ be a net in $X .$ Write $y = lim_{n \to \infty} x_{n}$ if $y$ is a limit point of $\overset{⇀}{x}$ with respect to the tail filter on $P .$

Let $\overset{⇀}{x} = (x_{1}, x_{2}, \dots)$ be a sequence in $X .$ Write $y = lim_{n \to \infty} x_{n},$ if $y$ is a limit point of $\begin{matrix} \overset{⇀}{x} : & ℤ_{> 0} & ⟶ & X \\ n & ⟼ & x_{n} \end{matrix}$ with respect to the tail filter on $ℤ_{> 0} .$

A cluster point of a sequence $\overset{⇀}{x} = (x_{1}, x_{2}, \dots)$ in $X$ is a cluster point of $\begin{matrix} \overset{⇀}{x} : & ℤ_{> 0} & ⟶ & X \\ n & ⟼ & x_{n} \end{matrix}$ with respect to the tail filter on $ℤ_{> 0} .$

Let $X$ be a topological space.

(a)

Let

A \subseteq X .

Then

\begin{array}{rcl} \overline{A} & = & {z \in X | there exists a filter ℱ on X with A \in ℱ and lim_{ℱ} = z} \\ = & {z \in X | there exists a net \overset{⇀}{a} : P \to A with lim_{n \to \infty} a_{n} = z} . \end{array}

(b)

Let

Y

be a topological space and let

f : X \to Y

be a function. The following are equivalent.

(1)	$f : X \to Y$ is continuous.
(2)	If $ℱ$ is a filter on $X$ and $lim_{ℱ}$ exists then $f (lim_{ℱ}) = lim_{ℱ} f .$
(3)	If $a \in X$ then $lim_{x \to a} f (x) = f (a) .$
(4)	If $\begin{matrix} \overset{⇀}{x} : & P & ⟶ & X \\ n & ⟼ & x_{n} \end{matrix}$ is a net in $X$ and $lim_{n \to \infty} x_{n}$ exists then $lim_{n \to \infty} f (x_{n}) = f (lim_{n \to \infty} x_{n}) .$

Notes and References: See [Clark, Cor. 5.9 and Prop. 5.14].

A topological space $X$ is first countable if $X$ satisfies: if $a \in X$ then there exists a countable collection of neighbourhoods of $x$ which generates $𝒩 (a) .$

Let $X$ be a first countable topological space.

(a)

Let

A \subseteq X .

Then

\overline{A} = {z \in X | there exists a sequence (a_{1}, a_{2}, \dots) in A with lim_{n \to \infty} α_{n} = z} .

(b)

Let

Y

be a topological space and let

f : X \to Y

be a function. The following are equivalent

(1)	$f$ is continuous.
(2)	If $\overset{⇀}{x} = (x_{1}, x_{2}, \dots)$ is a sequence in $X$ and $lim_{n \to \infty} x_{n}$ exists then $lim_{n \to \infty} f (x_{n}) = f (lim_{n \to \infty} x_{n}) .$

Let $X$ be a topological space and let $(x_{1}, x_{2}, \dots)$ be a sequence in $X .$

(a)	If $(x_{n_{1}}, x_{n_{2}}, \dots)$ is a subsequence of $(x_{1}, x_{2}, \dots)$ and $y = lim_{x \to \infty} x_{n_{k}}$ exists then $y$ is a cluster point of $(x_{1}, x_{2}, \dots) .$
(b)	If $X$ is first countable and $y$ is a cluster point of $(x_{1}, x_{2}, \dots)$ then there exists a subsequence $(x_{n_{1}}, x_{n_{2}}, \dots)$ of $(x_{1}, x_{2}, \dots)$ such that $y = lim_{k \to \infty} x_{n_{k}} .$

Let $X$ be an uncountable set and let $𝒯 = {A \subseteq X | A^{c} is countable} .$ Show that

(a)	$X$ is a topological space.
(b)	$X$ is not first countable.
(c)	$X$ is not Hausdorff.
(d)	$X$ is not discrete.
(e)	If $(x_{1}, x_{2}, \dots)$ is a sequence in $X$ and $y = lim_{n \to \infty} x_{n}$ exists then there exists $N \in ℤ_{> 0}$ such that if $n \in ℤ_{\geq N}$ then $x_{n} = y$ i.e., $(x_{1}, x_{2}, \dots)$ is eventually constant at $y .$
(f)	If $A \subseteq X$ and $A$ is uncountable then $\overline{A} = X .$
(g)	If $A \subseteq X$ then ${z \in X \| there exists a sequence (a_{1}, a_{2}, \dots) in A with z = lim_{n \to \infty} a_{n}} = A .$
(h)	If $A \subseteq X$ is uncountable and $A \neq X$ then $\overline{A} \neq {z \in X \| there exists a sequence (a_{1}, a_{2}, \dots) in A with z = lim_{n \to \infty} a_{n}} .$

Notes and References: [Clark Example 2.1.5]

Notes and References

These are a typed copy of Lecture 46 from a series of handwritten lecture notes for the class Metric and Hilbert Spaces given on October 19, 2014.

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