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sluiting

Sluiting is a term used in topology to denote the closure of a subset within a topological space. If X is a topological space and A is a subset of X, the sluiting cl(A) is the smallest closed set that contains A. Equivalently, it can be described as the intersection of all closed sets containing A, or as the set of all points x in X for which every open neighborhood of x intersects A.

Key properties of sluiting include: A is always contained in cl(A); cl(A) is a closed set; applying

Cl(A) is used to define other concepts, such as the interior int(A) and the boundary ∂A = cl(A)

Typical examples include the closure of the interval (0,1) in the real line with the standard topology,

sluiting
twice
yields
the
same
result
(cl(cl(A))
=
cl(A));
sluiting
distributes
over
unions
(cl(A
∪
B)
=
cl(A)
∪
cl(B));
and
cl(A
∩
B)
⊆
cl(A)
∩
cl(B).
The
operation
is
monotone:
if
A
⊆
B,
then
cl(A)
⊆
cl(B).
In
a
metric
space,
x
belongs
to
cl(A)
if
and
only
if
every
neighborhood
of
x
contains
a
point
of
A,
and
equivalently
x
is
either
in
A
or
a
limit
point
of
A.
A
common
characterization
is
that
cl(A)
=
A
∪
A',
where
A'
is
the
set
of
limit
points
of
A.
\
int(A).
Notation
varies
by
language;
in
Dutch
texts,
sluiting
is
the
standard
term
for
this
concept,
often
written
as
overline{A}
in
English-language
literature.
which
is
[0,1],
and
the
closure
of
a
finite
set
is
the
set
itself.
The
sluitening
operation
is
fundamental
to
convergence,
continuity,
and
the
study
of
topological
properties.