Ultraconnected space explained

In mathematics, a topological space is said to be ultraconnected if no two nonempty closed sets are disjoint.^[1] Equivalently, a space is ultraconnected if and only if the closures of two distinct points always have non trivial intersection. Hence, no T₁ space with more than one point is ultraconnected.^[2]

Properties

Every ultraconnected space

is path-connected (but not necessarily arc connected). If

and

are two points of

and

is a point in the intersection

\operatorname{cl}\{a\}\cap\operatorname{cl}\{b\}

, the function

f:[0,1]\toX

defined by

f(t)=a

0\let<1/2

f(1/2)=p

and

f(t)=b

1/2<t\le1

, is a continuous path between

and

.^[2]

Every ultraconnected space is normal, limit point compact, and pseudocompact.^[1]

Examples

The following are examples of ultraconnected topological spaces.

A set with the indiscrete topology.
The Sierpiński space.
A set with the excluded point topology.
The right order topology on the real line.^[3]

References

- Lynn Arthur Steen and J. Arthur Seebach, Jr., Counterexamples in Topology. Springer-Verlag, New York, 1978. Reprinted by Dover Publications, New York, 1995. (Dover edition).

Notes and References

PlanetMath
Steen & Seebach, Sect. 4, pp. 29-30
Steen & Seebach, example #50, p. 74

Ultraconnected space explained

Properties

Examples

See also

References

Notes and References