Theorem: A compact Hausdorff space is normal. In fact, if A,B are compact subsets of a Hausdorff space, and are disjoint, there exist disjoint open sets U,V , such that A⊂U A ⊂ U and B⊂V B ⊂ V .

Every discrete space is locally compact. Every open topological subspace X⊂openK of a compact Hausdorff space K is a locally compact topological space. In particular every compact Hausdorff space itself is locally compact.

Definition. A topological space X is locally compact at point x if there is some compact subspace X of X that contains a neighborhood of x. R is locally comapct since x ∈ R lies in neighborhood (x − 1,x + 1) which is in the compact space [x − 1,x + 1].

According to the definition of the compact set, we need every open cover of set K contains a finite subcover. Hence, not every subsets of compact sets are compact.

The bounded closed interval [0, 1] is compact and its maximum 1 and minimum 0 belong to the set, while the open interval (0, 1) is not compact and its supremum 1 and infimum 0 do not belong to the set. The unbounded, closed interval [0, ∞) is not compact, and it has no maximum.

A closed and bounded subset S of R2 is t-compact.

The real line R is not compact since the open covering A = {(n, n+1) | n ∈ Z} has no finite subcover since any finite subset of A can contain only a finite number of elements of Z.

Singleton Set in Discrete Space is Compact.

A compact number formatting refers to the representation of a number in a shorter form, based on the patterns provided for a given locale. For example: In the US locale , 1000 can be formatted as “1K” , and 1000000 as “1M” , depending upon the style used.

There are some special compact sets: the convergent sequence and its limit, the unit interval and its products, and the unit circle.

A metric space X is compact if every open cover of X has a finite subcover. 2. A metric space X is sequentially compact if every sequence of points in X has a convergent subsequence converging to a point in X. In fact, [0,1] is also compact (as we will see shortly).

1. Show that the union of two compact sets is compact, and that the intersection of any number of compact sets is compact. The union of these subcovers, which is finite, is a subcover for X1 ∪ X2. The intersection of any number of compact sets is a closed subset of any of the sets, and therefore compact.

Thus the open cover C defined in (⋆) has no finite subcover, and so (0,1) is not compact. In many topologies, open sets can be compact. In fact, the empty set is always compact. the empty set and real line are open.

Uα = X. Proposition 2.1 A metric space X is compact if and only if every collection F of closed sets in X with the finite intersection property has a nonempty intersection. points in X has a convergent subsequence.

The complex plane C is not compact.

Theorem 4: Every closed subset of a compact set of complex numbers is also compact. Proof: Let and be sets of complex numbers such that and let be closed and let be compact.

The whole plane is open because every point is interior (it has not frontier). It is closed, because it contains all the points, in particular, the limit points. Finally, it is perfect, because any point it is the limit point: take any point, in any neighborhood of it there are infinitely many points of the plane.

Connected Set: An open set S ⊂ C is said to be connected if each pair of points z1 and z2 in S can be joined by a polygonal line consisting of a finite number of line segments joined end to end that lies entirely in S. Domain/Region: An open, connected set is called a domain.

It follows that any subspace of X is connected if it is connected with respect to the induced (subspace) topology on it. A connected subspace is a subset which is a connected space wrt the induced topology. (A connected component is a maximal (wrt to inclusion) connected subset of X. )

From Wikipedia, the free encyclopedia. In mathematical analysis, the word region usually refers to a subset of or. that is open (in the standard Euclidean topology), simply connected and non-empty. A closed region is sometimes defined to be the closure of a region.