Neighbourhood (topology)/Related Articles: Difference between revisions

From Citizendium
Jump to navigation Jump to search
imported>Milton Beychok
m (Neighbourhood (Mathematics)/Related Articles moved to Neighbourhood (topology)/Related Articles: Better name because Neighbourhood has many meanings in mathematics)
imported>Peter Schmitt
(topics rearranged / topics added)
Line 1: Line 1:
{{subpages}}
{{subpages}}


==Parent topics==
== Parent topics ==


{{r|Mathematics}}
{{r|Mathematics}}
{{r|Topology}}
{{r|Topological space}}


==Subtopics==
== Subtopics ==


{{r|Topology}}
{{r|Limit (mathematics)}}


==Other related topics==
== Other related topics ==


{{r|Separation axiom}}
{{r|Filter (mathematics)}}
{{r|Filter (mathematics)}}
{{r|Topological space}}

Revision as of 08:00, 28 May 2009

This article has a Citable Version.
Main Article
Discussion
Related Articles  [?]
Bibliography  [?]
External Links  [?]
Citable Version  [?]
 
A list of Citizendium articles, and planned articles, about Neighbourhood (topology).
See also changes related to Neighbourhood (topology), or pages that link to Neighbourhood (topology) or to this page or whose text contains "Neighbourhood (topology)".

Parent topics

  • Mathematics [r]: The study of quantities, structures, their relations, and changes thereof. [e]
  • Topology [r]: A branch of mathematics that studies the properties of objects that are preserved through continuous deformations (such as stretching, bending and compression). [e]
  • Topological space [r]: A mathematical structure (generalizing some aspects of Euclidean space) defined by a family of open sets. [e]

Subtopics

  • Limit (mathematics) [r]: Mathematical concept based on the idea of closeness, used mainly in studying the behaviour of functions close to values at which they are undefined. [e]

Other related topics

  • Separation axiom [r]: A property that describes how good points in a topological space can be distinguished. [e]
  • Filter (mathematics) [r]: A family of subsets of a given set which has properties generalising the notion of "almost all natural numbers". [e]