Proximity Space
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topology In mathematics, topology (from the Greek language, Greek words , and ) is concerned with the properties of a mathematical object, geometric object that are preserved under Continuous function, continuous Deformation theory, deformations, such ...
, a proximity space, also called a nearness space, is an axiomatization of the intuitive notion of "nearness" that hold set-to-set, as opposed to the better known point-to-set notion that characterize
topological space In mathematics, a topological space is, roughly speaking, a geometrical space in which closeness is defined but cannot necessarily be measured by a numeric distance. More specifically, a topological space is a set whose elements are called points ...
s. The concept was described by but ignored at the time.W. J. Thron, ''Frederic Riesz' contributions to the foundations of general topology'', in C.E. Aull and R. Lowen (eds.), ''Handbook of the History of General Topology'', Volume 1, 21-29, Kluwer 1997. It was rediscovered and axiomatized by V. A. Efremovič in 1934 under the name of infinitesimal space, but not published until 1951. In the interim, discovered a version of the same concept under the name of separation space.


Definition

A (X, \delta) is a set X with a
relation Relation or relations may refer to: General uses *International relations, the study of interconnection of politics, economics, and law on a global level *Interpersonal relationship, association or acquaintance between two or more people *Public ...
\delta between subsets of X satisfying the following properties: For all subsets A, B, C \subseteq X # A \;\delta\; B implies B \;\delta\; A # A \;\delta\; B implies A \neq \varnothing # A \cap B \neq \varnothing implies A \;\delta\; B # A \;\delta\; (B \cup C) implies (A \;\delta\; B or A \;\delta\; C) # (For all E, A \;\delta\; E or B \;\delta\; (X \setminus E)) implies A \;\delta\; B Proximity without the first axiom is called (but then Axioms 2 and 4 must be stated in a two-sided fashion). If A \;\delta\; B we say A is near B or A and B are ; otherwise we say A and B are . We say B is a or of A, written A \ll B, if and only if A and X \setminus B are apart. The main properties of this set neighborhood relation, listed below, provide an alternative axiomatic characterization of proximity spaces. For all subsets A, B, C, D \subseteq X # X \ll X # A \ll B implies A \subseteq B # A \subseteq B \ll C \subseteq D implies A \ll D # (A \ll B and A \ll C) implies A \ll B \cap C # A \ll B implies X \setminus B \ll X \setminus A # A \ll B implies that there exists some E such that A \ll E \ll B. A proximity space is called if \ \;\delta\; \implies x = y. A or is one that preserves nearness, that is, given f : (X, \delta) \to \left(X^*, \delta^*\right), if A \;\delta\; B in X, then f \;\delta^*\; f /math> in X^*. Equivalently, a map is proximal if the inverse map preserves proximal neighborhoodness. In the same notation, this means if C \ll^* D holds in X^*, then f^ \ll f^ /math> holds in X.


Properties

Given a proximity space, one can define a topology by letting A \mapsto \left\ be a
Kuratowski closure operator In topology and related branches of mathematics, the Kuratowski closure axioms are a set of axioms that can be used to define a topological structure on a set. They are equivalent to the more commonly used open set definition. They were first form ...
. If the proximity space is separated, the resulting topology is Hausdorff. Proximity maps will be continuous between the induced topologies. The resulting topology is always
completely regular In topology and related branches of mathematics, Tychonoff spaces and completely regular spaces are kinds of topological spaces. These conditions are examples of separation axioms. A Tychonoff space refers to any completely regular space that is ...
. This can be proven by imitating the usual proofs of
Urysohn's lemma In topology, Urysohn's lemma is a lemma that states that a topological space is normal if and only if any two disjoint closed subsets can be separated by a continuous function. Section 15. Urysohn's lemma is commonly used to construct continuo ...
, using the last property of proximal neighborhoods to create the infinite increasing chain used in proving the lemma. Given a compact Hausdorff space, there is a unique proximity whose corresponding topology is the given topology: A is near B if and only if their closures intersect. More generally, proximities classify the compactifications of a completely regular Hausdorff space. A
uniform space In the mathematical field of topology, a uniform space is a set with a uniform structure. Uniform spaces are topological spaces with additional structure that is used to define uniform properties such as completeness, uniform continuity and unifo ...
X induces a proximity relation by declaring A is near B if and only if A \times B has nonempty intersection with every entourage.
Uniformly continuous In mathematics, a real function f of real numbers is said to be uniformly continuous if there is a positive real number \delta such that function values over any function domain interval of the size \delta are as close to each other as we want. In ...
maps will then be proximally continuous.


See also

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References

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External links

* {{Topology Closure operators General topology