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proximitii

Proximitii is a term used in topology to describe a family of proximity relations that express the notion of nearness between subsets of a common set. Each proximitium δ defines, for any two subsets A and B of a given space X, whether A and B are near. The collection of such relations, when organized as a family, is referred to as proximitii.

Proximitii generalize the classical concept of a proximity relation. They typically satisfy symmetry (A δ B implies

Examples and applications: In Euclidean spaces with the usual topology, one common proximitium is A δ B

Terminology: proximitii is a plural form used in some texts to distinguish multiple proximity relations on

B
δ
A),
monotonicity
(if
A
⊆
A'
and
B
⊆
B'
and
A
δ
B
then
A'
δ
B'),
and
compatibility
with
closure
in
the
underlying
topology.
In
a
standard
formulation,
a
proximity
relation
δ
on
a
topological
space
X
is
linked
to
the
closure
operator
by
defining
A
δ
B
to
hold
when
the
closures
of
A
and
B
intersect.
Different
proximitii
may
be
parameterized
by
a
space,
a
scale,
or
a
modeling
assumption,
allowing
a
single
underlying
X
to
carry
multiple
“nearness”
structures
simultaneously.
if
closure(A)
∩
closure(B)
≠
∅.
Proximitii
have
found
use
in
domains
where
quantitative
distances
are
unavailable
or
undesirable,
such
as
qualitative
spatial
reasoning,
image
analysis,
clustering,
and
geographic
information
systems,
where
a
notion
of
nearness
drives
algorithms
and
decision-making.
They
also
relate
to
other
generalized
nearness
concepts
such
as
proximity
spaces
and
nearness
relations.
the
same
underlying
set;
in
more
common
usage
these
are
simply
called
proximity
relations
or
proximity
structures.