First-countable space explained

In topology, a branch of mathematics, a first-countable space is a topological space satisfying the "first axiom of countability". Specifically, a space

is said to be first-countable if each point has a countable neighbourhood basis (local base). That is, for each point

there exists a sequence

N_1,N_2,\ldots

of neighbourhoods of

such that for any neighbourhood

there exists an integer

with

N_i

contained in

Since every neighborhood of any point contains an open neighborhood of that point, the neighbourhood basis can be chosen without loss of generality to consist of open neighborhoods.

Examples and counterexamples

The majority of 'everyday' spaces in mathematics are first-countable. In particular, every metric space is first-countable. To see this, note that the set of open balls centered at

with radius

1/n

for integers form a countable local base at

An example of a space that is not first-countable is the cofinite topology on an uncountable set (such as the real line). More generally, the Zariski topology on an algebraic variety over an uncountable field is not first-countable.

\omega₁+1=\left[0,\omega_1\right]

where

\omega₁

is the first uncountable ordinal number. The element

\omega₁

is a limit point of the subset

\left[0,\omega_1\right)

even though no sequence of elements in

\left[0,\omega_1\right)

has the element

\omega₁

as its limit. In particular, the point

\omega₁

in the space

\omega₁+1=\left[0,\omega_1\right]

does not have a countable local base. Since

\omega₁

is the only such point, however, the subspace

\omega₁=\left[0,\omega_1\right)

is first-countable.

\R/\N

where the natural numbers on the real line are identified as a single point is not first countable. However, this space has the property that for any subset

and every element

in the closure of

there is a sequence in A converging to

A space with this sequence property is sometimes called a Fréchet–Urysohn space.

First-countability is strictly weaker than second-countability. Every second-countable space is first-countable, but any uncountable discrete space is first-countable but not second-countable.

Properties

One of the most important properties of first-countable spaces is that given a subset

a point

lies in the closure of

if and only if there exists a sequence

\left(x_n\right)

	infty

	n=1

that converges to

(In other words, every first-countable space is a Fréchet-Urysohn space and thus also a sequential space.) This has consequences for limits and continuity. In particular, if

is a function on a first-countable space, then

has a limit

at the point

if and only if for every sequence

x_n\tox,

where

x_n ≠ x

for all

we have

f\left(x_n\right)\toL.

Also, if

is a function on a first-countable space, then

is continuous if and only if whenever

x_n\tox,

then

f\left(x_n\right)\tof(x).

\left[0,\omega_1\right).

Every first-countable space is compactly generated.

Every subspace of a first-countable space is first-countable. Any countable product of a first-countable space is first-countable, although uncountable products need not be.

Bibliography

- Book: Engelking, Ryszard . Ryszard Engelking

. Ryszard Engelking . General Topology . Heldermann Verlag, Berlin . 1989 . 3885380064. Revised and completed . Sigma Series in Pure Mathematics, Vol. 6.