Neighbourhood (topology): Difference between revisions
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In [[topology]], a '''neighbourhood of a point''' is any set that belongs to the '''neighbourhood system''' at that point. | |||
The notion of neighbourhood systems is used to describe, | |||
in an abstract setting, the concept of points near a given point, | |||
a concept that cannot be expressed by a single set. | |||
It is modelled after the situation in [[real analysis]] | |||
where the points in small balls are considered as near to the centre of the ball. | |||
Neighbourhoods are used to define | |||
[[limit (mathematics)|convergence]] and [[continuous functions]]: | |||
: '''Convergence''' ''(Definition)'' <br> A sequence converges to a point if and only if every neighbourhood of that point contains almost all (i.e., all but finitely many) elements of the sequence. | |||
: '''Continuity''' ''(Definition)'' <br> A function ''f'' is continuous at a point ''x'' if and only if for every neighbourhood ''U'' of ''f(x)'' there is a neighbourhood ''V'' of ''x'' for which the image ''f(V)'' under ''f'' is a subset of ''U''. | |||
== Neighbourhood spaces == | |||
A set ''X'' is called a '''neighbourhood space''' | |||
if for every ''x'' in ''X'' | |||
there is a nonempty family ''N(x)'' (the '''neighbourhood system''' at ''x'') of sets, called neighbourhoods of ''x'', | |||
which satisfies the following axioms: | |||
# ''x'' is an element of every neighborhood of ''x''. | |||
# Any set that contains a neighbourhood of ''x'' is a neighbourhood of ''x''. | |||
# The intersection of any two (and therefore of any finite collection of) neighbourhoods of ''x'' is a neighbourhood of ''x''. | |||
# Any neighbourhood of ''x'' contains an '''open neighbourhood''' of ''x'',<br> i.e., a neighbourhood of ''x'' that belongs to ''N(y)'' for all of its elements ''y''. | |||
Axioms (2-3) imply that ''N(x)'' is a [[filter (mathematics)|filter]]. | |||
Accordingly, the neighbourhood system at a point | |||
is also called the '''neighbourhood filter''' of the point. | |||
<br> | |||
Axiom (4) defines how neighbourhood systems at distinct points interact. | |||
=== Neighbourhood base === | |||
To define a neighbourhood space it is often more convenient to describe, | |||
for all ''x'', only a base for the neighbourhood system. | |||
<br> | |||
A nonempty family ''B(x)'' of sets is a '''neighbourhood base''' at ''x'' if it satisfies the following axioms: | |||
# ''x'' is an element of every set in ''B(x)''. | |||
# The intersection of any two sets of ''B(x)'' contains a set of ''B(x)''. | |||
# Any set of ''B(x)'' contains an open neighbourhood ''V'' of ''x'',<br> i.e., a set ''V'' (not necessarily a member of ''B(x)'') that contains some set of ''B(y)'' for all of its elements ''y'' in ''V''. | |||
Axiom (2) implies that ''B(x)'' is a [[filter (mathematics)|filter base]]. | |||
<br> | |||
The family ''N(x)'' consisting of all sets containing a set of ''B(x)'' | |||
is the neighbourhood filter '''induced''' by ''B(x)'' | |||
<br> | |||
Two neighbourhood bases ''B<sub>1</sub>(x)'' and ''B<sub>2</sub>(x)'' are called equivalent | |||
if they induce the same neighbourhood system ''N(x)'' at ''x''. | |||
(This is the case if and only if each set in ''B<sub>1</sub>(x)'' contains a set in ''B<sub>2</sub>(x)'', | |||
and if, vice versa, each set in ''B<sub>2</sub>(x)'' contains a set in ''B<sub>1</sub>(x)''.) | |||
<br> | |||
If there exist [[countable]] neighbourhood bases at all ''x'' in ''X'', | |||
then the corresponding topological (or, equivalently, neighbourhood) space is said to be '''[[first-countable]]'''. | |||
=== Example: Metric spaces === | |||
In a [[metric space]] the (open or closed) balls with centre ''x'' form a neighbourhood base at ''x'' | |||
and define the topology induced by the metric. | |||
<br> | |||
Moreover, it is sufficient to take the balls with radius ''1/n'' for all natural numbers ''n'' | |||
(that is, a [[countable]] set for each point ''x''), therefore metric spaces are first-countable. | |||
The classical example (in calculus or real analysis) is <math> \mathbb R^d </math>: | |||
: A neighbourhood base at <math> x \in \mathbb R^d </math> is given by | |||
:: <math> \mathcal B(x) = \left\{ B(x,n) \mid n \in \mathbb N \right\} </math> | |||
: where | |||
:: <math> B(x,n) = \left\{ y \left\vert \left| y-x \right| < {1\over n} \right. , y \in \mathbb R^d \right\} \subset \mathbb R^d</math> | |||
: are the open balls with centre <math>x</math> and radius <math> 1/n </math>. | |||
=== Neighbourhood of a set === | === Neighbourhood of a set === | ||
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if ''U'' is a neighbourhood for all points of ''S'' or, equivalently, | if ''U'' is a neighbourhood for all points of ''S'' or, equivalently, | ||
if ''U'' contains an open set that contains ''S''. | if ''U'' contains an open set that contains ''S''. | ||
=== Relation to topological spaces === | |||
Neighbourhood spaces are one of several equivalent means | |||
to define a [[topological space]]. | |||
The equivalence is obtained by the following definitions: | |||
: ''(Definition)'' <br> In a neighbourhood space, a set is '''open''' if it is a neighbourhood of all its points. | |||
: ''(Definition)'' <br> In a topological space, a set is a '''neighbourhood''' of a point if it contains an open set that contains the point. <br> (In other words, the open sets containing a point form a '''neighbourhood base''' at this point.) |
Revision as of 04:17, 29 May 2009
In topology, a neighbourhood of a point is any set that belongs to the neighbourhood system at that point. The notion of neighbourhood systems is used to describe, in an abstract setting, the concept of points near a given point, a concept that cannot be expressed by a single set. It is modelled after the situation in real analysis where the points in small balls are considered as near to the centre of the ball.
Neighbourhoods are used to define convergence and continuous functions:
- Convergence (Definition)
A sequence converges to a point if and only if every neighbourhood of that point contains almost all (i.e., all but finitely many) elements of the sequence. - Continuity (Definition)
A function f is continuous at a point x if and only if for every neighbourhood U of f(x) there is a neighbourhood V of x for which the image f(V) under f is a subset of U.
Neighbourhood spaces
A set X is called a neighbourhood space if for every x in X there is a nonempty family N(x) (the neighbourhood system at x) of sets, called neighbourhoods of x, which satisfies the following axioms:
- x is an element of every neighborhood of x.
- Any set that contains a neighbourhood of x is a neighbourhood of x.
- The intersection of any two (and therefore of any finite collection of) neighbourhoods of x is a neighbourhood of x.
- Any neighbourhood of x contains an open neighbourhood of x,
i.e., a neighbourhood of x that belongs to N(y) for all of its elements y.
Axioms (2-3) imply that N(x) is a filter.
Accordingly, the neighbourhood system at a point
is also called the neighbourhood filter of the point.
Axiom (4) defines how neighbourhood systems at distinct points interact.
Neighbourhood base
To define a neighbourhood space it is often more convenient to describe,
for all x, only a base for the neighbourhood system.
A nonempty family B(x) of sets is a neighbourhood base at x if it satisfies the following axioms:
- x is an element of every set in B(x).
- The intersection of any two sets of B(x) contains a set of B(x).
- Any set of B(x) contains an open neighbourhood V of x,
i.e., a set V (not necessarily a member of B(x)) that contains some set of B(y) for all of its elements y in V.
Axiom (2) implies that B(x) is a filter base.
The family N(x) consisting of all sets containing a set of B(x)
is the neighbourhood filter induced by B(x)
Two neighbourhood bases B1(x) and B2(x) are called equivalent
if they induce the same neighbourhood system N(x) at x.
(This is the case if and only if each set in B1(x) contains a set in B2(x),
and if, vice versa, each set in B2(x) contains a set in B1(x).)
If there exist countable neighbourhood bases at all x in X,
then the corresponding topological (or, equivalently, neighbourhood) space is said to be first-countable.
Example: Metric spaces
In a metric space the (open or closed) balls with centre x form a neighbourhood base at x
and define the topology induced by the metric.
Moreover, it is sufficient to take the balls with radius 1/n for all natural numbers n
(that is, a countable set for each point x), therefore metric spaces are first-countable.
The classical example (in calculus or real analysis) is :
- A neighbourhood base at is given by
- where
- are the open balls with centre and radius .
Neighbourhood of a set
A set U is called neighbourhood of the set S if U is a neighbourhood for all points of S or, equivalently, if U contains an open set that contains S.
Relation to topological spaces
Neighbourhood spaces are one of several equivalent means to define a topological space. The equivalence is obtained by the following definitions:
- (Definition)
In a neighbourhood space, a set is open if it is a neighbourhood of all its points. - (Definition)
In a topological space, a set is a neighbourhood of a point if it contains an open set that contains the point.
(In other words, the open sets containing a point form a neighbourhood base at this point.)