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Closure

Closure is a concept used across disciplines to denote bringing something to a complete or settled state. In everyday usage it often refers to ending a process or resolving a concern. In mathematics and related fields, closure has precise definitions that describe how a set or a process can be completed within a given structure.

In algebra, a subset is closed under an operation if applying the operation to members yields a

In topology, the closure of a subset A is the intersection of all closed sets containing A;

In computer science, a closure is a function paired with its lexical environment, enabling the function to

In psychology and everyday life, closure refers to achieving acceptance or resolution after an unresolved event,

member
of
the
same
subset.
For
example,
even
integers
are
closed
under
addition
and
subtraction.
A
closure
operator
on
a
set
assigns
to
each
subset
the
smallest
closed
superset
and
satisfies
extensivity
(the
subset
is
contained
in
its
closure),
idempotence
(the
closure
of
a
closure
is
the
same),
and
monotonicity
(if
A
is
contained
in
B,
then
the
closure
of
A
is
contained
in
the
closure
of
B).
In
field
theory,
the
algebraic
closure
of
a
field
is
a
minimal
field
extension
in
which
every
polynomial
splits
into
linear
factors;
the
notion
also
appears
as
the
substructure
generated
by
a
given
set.
equivalently,
it
is
A
together
with
all
its
limit
points.
The
closure
contains
A
and
is
used
to
discuss
convergence
and
continuity.
The
boundary
of
A
can
be
described
as
the
closure
of
A
minus
its
interior.
access
non-local
variables
even
when
invoked
outside
their
defining
scope.
In
logic,
closure
properties
describe
what
can
be
derived
from
axioms
or
rules
of
inference.
providing
a
sense
of
finality
and
coherence.