Difference between revisions of "The Continuous Extension Theorem"

Revision as of 12:48, 20 October 2021

The Uniform Continuity Theorem states that if a function $I=[a,b]$ is a closed and bounded interval and $f:I\to \mathbb {R}$ is continuous on $I$ , then $f$ must also be uniformly continuous on $I$ . The succeeding theorem will help us determine when a function $f$ is uniformly continuous when $I$ is instead a bounded open interval.

Before we look at The Continuous Extension Theorem though, we will need to prove the following lemma.

Lemma 1: If $f:A\to \mathbb {R}$ is a uniformly continuous function and if $(x_{n})$ is a Cauchy Sequence from $A$ , then $(f(x_{n}))$ is a Cauchy sequence from $\mathbb {R}$ .

Proof: Let $f:A\to \mathbb {R}$ be a uniformly continuous function and let $(x_{n})$ be a Cauchy sequence from $A$ . We want to show that $(f(x_{n}))$ is also a Cauchy sequence. Recall that to show that $(f(x_{n}))$ is a Cauchy sequence we must show that $\forall \varepsilon >0$ then $\exists N\in \mathbb {N}$ such that $\forall m,n\in \mathbb {N}$ , if $m,n\geq N$ then $\mid f(x_{n})-f(x_{m})\mid <\varepsilon$ .

Since $f$ is uniformly continuous on $A$ , then for any $\varepsilon >0$ , $\exists \delta _{\varepsilon }.0$ such that for all $x,y\in A$ where $\mid x-y\mid <\delta _{\varepsilon }$ we have that $\mid f(x)-f(y)\mid <\varepsilon$ .

Now for $\delta _{\varepsilon }>0$ , since $(x_{n})$ is a Cauchy sequence then $\exists N_{\delta _{\varepsilon }}\in \mathbb {N}$ such that $\forall m,n\geq N_{\delta _{\varepsilon }}$ we have that $\mid x_{n}-x_{M}\mid <\delta _{\varepsilon }$ . So this $N_{\delta _{\varepsilon }}$ will do for the sequence $(f(x_{n}))$ . So for all $n,m\geq N_{\delta _{\varepsilon }}$ we have that $\mid x_{n}-x_{m}\mid <\delta _{\varepsilon }$ and from the continuity of $f$ this implies that $\mid f(x_{n})-f(x_{m})\mid <\varepsilon$ and so $(f(x_{n}))$ is a Cauchy sequence. $\blacksquare$

We are now ready to look at The Continuous Extension Theorem.

Theorem 1 (The Continuous Extension Theorem): If $I=(a,b)$ is an interval, then $f:I\to \mathbb {R}$ is a uniformly continuous function on $I$ if and only if $f$ can be defined at the endpoints $a$ and $b$ such that $f$ is continuous on $[a,b]$ .

Proof: $\Rightarrow$ Suppose that $f$ is uniformly continuous on $I=(a,b)$ . Let $(x_{n})$ be a sequence in $(a,b)$ that converges to $a$ . Then since $(x_{n})$ is a convergent sequence, it must also be a Cauchy sequence. By lemma 1, since $(x_{n})$ is a Cauchy sequence then $(f(x_{n}))$ is also a Cauchy sequence, and so $(f(x_{n}))$ must converge in $\mathbb {R}$ , that is $\lim _{n\to \infty }f(x_{n})=L$ for some $L\in \mathbb {R}$ .

Now suppose that $(y_{n})$ is another sequence in $(a,b)$ that converges to $a$ . Then $\lim _{n\to \infty }(x_{n}-y_{n})=a-a=0$ , and so by the uniform continuity of $f$ :

$:\lim _{n\to \infty }f(y_{n})=\lim _{n\to \infty }[f(y_{n})-f(x_{n})+f(x_{n})]:\lim _{n\to \infty }f(y_{n})=\lim _{n\to \infty }[f(y_{n})-f(x_{n})]+\lim _{n\to \infty }f(x_{n}):\lim _{n\to \infty }f(y_{n})=0+L=L$

So for every sequence $(y_{n})$ in $(a,b)$ that converges to $a$ , we have that $(f(y_{n}))$ converges to $L$ . Therefore by the Sequential Criterion for Limits, we have that $f$ has the limit $L$ at the point $a$ . Therefore, define $f(a)=L$ and so $f$ is continuous at $a$ . We use the same argument for the endpoint $b$ , and so $f$ is can be extended so that $f$ is continuous on $[a,b]$ .

$\Leftarrow$ Suppose that $f$ is continuous on $[a,b]$ . By the Uniform Continuity Theorem, since $[a,b]$ is a closed and bounded interval then $f$ is uniformly continuous. $\blacksquare$

Resources

The Continuous Extension Theorem, mathonline.wikidot.com

@@ Line 36: / Line 36: @@
 </ul>
-<math>\begin{align} \lim_{n \to \infty} f(y_n) = \lim_{n \to \infty} [f(y_n) - f(x_n) + f(x_n)] \\ \lim_{n \to \infty} f(y_n) = \lim_{n \to \infty} [f(y_n) - f(x_n) ] + \lim_{n \to \infty} f(x_n) \\ \lim_{n \to \infty} f(y_n) = 0 + L = L \end{align}</math>
+<math>
+: \lim_{n \to \infty} f(y_n) = \lim_{n \to \infty} [f(y_n) - f(x_n) + f(x_n)]
+: \lim_{n \to \infty} f(y_n) = \lim_{n \to \infty} [f(y_n) - f(x_n) ] + \lim_{n \to \infty} f(x_n)
+: \lim_{n \to \infty} f(y_n) = 0 + L = L</math>
 <ul>
 <li>So for every sequence <math>(y_n)</math> in <math>(a, b)</math> that converges to <math>a</math>, we have that <math>(f(y_n))</math> converges to <math>L</math>. Therefore by the Sequential Criterion for Limits, we have that <math>f</math> has the limit <math>L</math> at the point <math>a</math>. Therefore, define <math>f(a) = L</math> and so <math>f</math> is continuous at <math>a</math>. We use the same argument for the endpoint <math>b</math>, and so <math>f</math> is can be extended so that <math>f</math> is continuous on <math>[a, b]</math>.</li>

Difference between revisions of "The Continuous Extension Theorem"

Revision as of 12:48, 20 October 2021

Resources

Navigation menu

Personal tools

Namespaces

Variants

Views

More

Search

Navigation

Tools