4.3 KiB
Math4201 Topology I (Lecture 31)
Compactness
Local compactness
\mathbb{R} is not compact but it has a "lot" of compact subspaces.
An arbitrary point x\in\mathbb{R} then there is a subset (x-\epsilon,x+\epsilon)U\subseteq \mathbb{R} such that x\in U and U is compact.
Definition of local compactness
A space X is locally compact if every point x\in X, there is a compact subspace K of X containing a neighborhood U of x x\in U\subseteq K such that K is compact.
Example
\mathbb{R}^\omega=\mathbb{R}\times \mathbb{R}\times \mathbb{R}\times \cdots with product topology.
where basis is
B=\{(a_1,b_1)\times (a_2,b_2)\times (a_3,b_3)\times \cdots\times \mathbb{R}\times \mathbb{R}\times \cdots \mid a_i,b_i\in \mathbb{R},a_i<b_i\}
all except finitely many of these open intervals are \mathbb{R}.
This space isn't locally compact.
Consider \underline{0}=(0,0,0,...)\in \mathbb{R}^\omega. If there is a compact subspace K of \mathbb{R}^\omega containing a neighborhood U of 0, then it should contain a basis element around \underline{0}.
And \overline{U}\subseteq K.
Since \overline{U} is closed in K, it has to be compact.
But \overline{U}=[a_1,b_1]\times [a_2,b_2]\times [a_3,b_3]\times \mathbb{R}\times \mathbb{R}\times \mathbb{R}\times \cdots which is not compact.
So we can find a open covering
V=\{[a_1,b_1]\times [a_2,b_2]\times [a_3,b_3]\times (-j,j)\times \mathbb{R}\times \mathbb{R}\times \cdots\mid j\in \mathbb{N}\}
which doesn't have a finite subcover.
Theorem of Homeomorphism over locally compact Hausdorff spaces
X is a locally compact Hausdorff space if and only if there exists topological space Y satisfying the following properties:
Xis a subspace ofY.Y-Xhas one point (usually denoted by\infty).Yis compact and Hausdorff.
Y is unique in the following sense:
If Y' is another such space, then there is a homeomorphism between Y and Y' f(x)=x for any x\in X.
Proof for existence of Y
Let Y=X\cup \{\infty\}. as a set.
Topology on Y:
U\subseteq Y is open if and only if either
U\subseteq XandUis open inX. (\infty\notin U)Y-U\subseteq XandY-Uwith the subspace topology fromXis compact. (\infty\in U)
We need to show that there is a topology on Y that satisfies the definition.
\emptyset\in \mathcal{T}because\emptyset\subseteq X,Y\in \mathcal{T}becauseY-Y=\emptysetis compact.- This topology is closed with respect to finite intersections.
ConsiderU,U'\in \mathcal{T}. ThenU\cap U'is open.
- Case 1:
\infty\notin U,U', thenU\cap U'is open inX. - Case 2:
\infty\in U,U'both, thenY-U,Y-U'with subspace topology fromXare compact. Note thatY-(U\cap U')=(Y-U)\cup (Y-U')is compact. - Case 3:
\infty\in Ubut notU', thenY-Uwith subspace topology fromXis compact. SoY-U\subseteq Xis compact, andU'\subseteq Xis open. AndY-U\subseteq Xis closed becauseXis Hausdorff. andY-U\subseteq Xis compact. SoU\cap U'is open in our topology.
Example for such Y
Consider X=(0,1), we can build Y=(0,1)\cup \{\infty\}=S^1.
Proof for the theorem
First we prove the uniqueness of f.
Y=X\cup \{\infty\}.
Y'=X\cup \{\infty'\}.
the function f:Y\to Y' is defined f(x)=x for x\in X and f(\infty)=\infty.
We show that f is a homeomorphism.
If f is clearly a bijection, we need to show U\subseteq Y is open if and only if f(U)\subseteq Y' is open.
- Suppose
U\subseteq Yis open.
Case 1, \infty\notin U, so U\subseteq X. (Note X is in Y) is open. \{\infty'\} is closed in Y' (since Y' is Hausdorff). f(U)=U\subseteq X (Note X is in Y') is open. So U\subseteq X' is open.
Case 2, \infty\in U.
Since U\subseteq Y is open, then Y-U is closed. Note that Y-U is closed in Y and Y is Hausdorff. So Y-U is also compact.
Since \infty\in U, then Y-U\subseteq X.
This implies that f(Y-U)\subseteq X\subset Y' is also compact.
Since Y-U\subseteq Y' and Y' is Hausdorff, then Y-U\subseteq Y' is closed.
So f(U)=U\subseteq Y' is open.
- Suppose
f(U)\subseteq Y'is open.