Filter (mathematics)

From Citizendium
Revision as of 15:10, 27 November 2008 by imported>Richard Pinch (new entry, just a stub, see talk page)
(diff) ← Older revision | Latest revision (diff) | Newer revision → (diff)
Jump to navigation Jump to search

In set theory, a filter is a family of subsets of a given set which has properties generalising those of neighbourhood in topology.

Formally, a filter on a set X is a subset of the power set with the properties:

If G is a subset of X then the family

is a filter, the principal filter on G.

In a topological space , the neighbourhoods of a point x

form a filter, the neighbourhood filter of x.

Ultrafilters

An ultrafilter is a maximal filter: that is, a filter on a set which is not properly contained in any other filter on the set. Equivalently, it is a filter with the property that for any subset either or the complement .

The principal filter on a singleton set {x}, namely, all subsets of X containing x, is an ultrafilter.