In topology, a proximity space, also called a nearness space, is an axiomatization of notions of "nearness" that hold set-to-set, as opposed to the better known point-to-set notions that characterize topological spaces.
The concept was described by Frigyes Riesz (1909) but ignored at the time. 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, A. D. Wallace (1941) discovered a version of the same concept under the name of separation space.
Definition A proximity space (X, δ) is a set X with a relation δ between subsets of X satisfying the following properties:
For all subsets A, B and C of X
Proximity without the first axiom is called quasi-proximity (but then Axioms 2 and 4 must be stated in a two-sided fashion).
If A δ B we say A is near B or A and B are proximal; otherwise we say A and B are apart. We say B is a proximal or δ-neighborhood of A, written A « B, if and only if A and X−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, and D of X
A proximity space is called separated if {x} δ {y} implies x = y.
A proximity or proximal map is one that preserves nearness, that is, given f:(X,δ) → (X*,δ*), if A δ B in X, then f[A] δ* f[B] in X*. Equivalently, a map is proximal if the inverse map preserves proximal neighborhoodness. In the same notation, this means if C «* D holds in X*, then f−1[C] « f−1[D] holds in X.
Given a proximity space, one can define a topology by letting A ↦ {x : {x} δ A} be a Kuratowski closure operator. If the proximity space is separated, the resulting topology is Hausdorff. Proximity maps will be continuous between the induced topologies.