Difference between revisions of "Semi-continuous mapping"
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''upper (lower)'' | ''upper (lower)'' | ||
− | A mapping | + | A mapping $ f $ |
+ | from a [[Topological space|topological space]] $ X $ | ||
+ | into a partially ordered set $ P $ | ||
+ | such that | ||
− | + | $$ | |
+ | \lim\limits x _ {n} = x | ||
+ | $$ | ||
implies that | implies that | ||
− | + | $$ | |
− | + | \overline{\lim\limits}\; f ( x _ {n} ) \leq f ( x) \ \left ( fnnme \underline{lim} f ( x _ {n} ) | |
− | + | \geq f ( x) \right ) , | |
− | + | $$ | |
+ | where $ \overline{\lim\limits}\; $( | ||
+ | $ fnnme \underline{lim} $) | ||
+ | denotes the [[limes superior]] (inferior). | ||
====Comments==== | ====Comments==== | ||
− | On a partially ordered set | + | On a partially ordered set $ P $ |
+ | the collection consisting of $ P $ | ||
+ | and all sets $ U _ {x} = \{ {y \in P } : {y < x } \} $ | ||
+ | is a base for a topology on $ P $, | ||
+ | denoted by $ \tau _ {-} $, | ||
+ | and $ P $ | ||
+ | and all sets $ V _ {x} = \{ {y \in P } : {y \geq x } \} $ | ||
+ | define a topology $ \tau _ {+} $. | ||
+ | The mapping $ f: X \rightarrow P $ | ||
+ | is upper semi-continuous, (u.s.c.) (respectively, lower semi-continuous (l.s.c.)) if and only if $ f : X \rightarrow ( P , \tau _ {+} ) $( | ||
+ | respectively, $ f: X \rightarrow ( P , \tau _ {-} ) $) | ||
+ | is continuous. | ||
− | In fact, upper and lower semi-continuity are usually defined only for mappings to the real line | + | In fact, upper and lower semi-continuity are usually defined only for mappings to the real line $ \mathbf R $. |
+ | In terms of open sets, one sees that $ f : X \rightarrow \mathbf R $ | ||
+ | is upper (lower) semi-continuous if and only if $ f ^ { - 1 } [ (- \infty , a)] $( | ||
+ | $ f ^ { - 1 } [( a, \infty )] $) | ||
+ | is open for every $ a $. | ||
− | Semi-continuity is also defined for set-valued mappings. A mapping | + | Semi-continuity is also defined for set-valued mappings. A mapping $ F : X \rightarrow 2 ^ {Y} $ |
+ | is upper (lower) semi-continuous if for every open subset $ U $ | ||
+ | of $ Y $ | ||
+ | the set $ \{ {x } : {F( x) \subseteq U } \} $( | ||
+ | the set $ \{ {x } : {F( x) \cap U \neq \emptyset } \} $) | ||
+ | is open. | ||
− | Note that if a mapping | + | Note that if a mapping $ f: X \rightarrow Y $ |
+ | is regarded as a set-valued mapping $ F : X \rightarrow 2 ^ {Y} $, | ||
+ | $ F( x) = \{ f( x) \} $, | ||
+ | then $ F $ | ||
+ | is lower semi-continuous if and only if $ f $ | ||
+ | is lower semi-continuous; and $ F $ | ||
+ | is upper semi-continuous if and only if $ f $ | ||
+ | is upper semi-continuous. | ||
====References==== | ====References==== | ||
<table><TR><TD valign="top">[a1]</TD> <TD valign="top"> R. Engelking, "General topology" , Heldermann (1989)</TD></TR></table> | <table><TR><TD valign="top">[a1]</TD> <TD valign="top"> R. Engelking, "General topology" , Heldermann (1989)</TD></TR></table> |
Latest revision as of 08:13, 6 June 2020
upper (lower)
A mapping $ f $ from a topological space $ X $ into a partially ordered set $ P $ such that
$$ \lim\limits x _ {n} = x $$
implies that
$$ \overline{\lim\limits}\; f ( x _ {n} ) \leq f ( x) \ \left ( fnnme \underline{lim} f ( x _ {n} ) \geq f ( x) \right ) , $$
where $ \overline{\lim\limits}\; $( $ fnnme \underline{lim} $) denotes the limes superior (inferior).
Comments
On a partially ordered set $ P $ the collection consisting of $ P $ and all sets $ U _ {x} = \{ {y \in P } : {y < x } \} $ is a base for a topology on $ P $, denoted by $ \tau _ {-} $, and $ P $ and all sets $ V _ {x} = \{ {y \in P } : {y \geq x } \} $ define a topology $ \tau _ {+} $. The mapping $ f: X \rightarrow P $ is upper semi-continuous, (u.s.c.) (respectively, lower semi-continuous (l.s.c.)) if and only if $ f : X \rightarrow ( P , \tau _ {+} ) $( respectively, $ f: X \rightarrow ( P , \tau _ {-} ) $) is continuous.
In fact, upper and lower semi-continuity are usually defined only for mappings to the real line $ \mathbf R $. In terms of open sets, one sees that $ f : X \rightarrow \mathbf R $ is upper (lower) semi-continuous if and only if $ f ^ { - 1 } [ (- \infty , a)] $( $ f ^ { - 1 } [( a, \infty )] $) is open for every $ a $.
Semi-continuity is also defined for set-valued mappings. A mapping $ F : X \rightarrow 2 ^ {Y} $ is upper (lower) semi-continuous if for every open subset $ U $ of $ Y $ the set $ \{ {x } : {F( x) \subseteq U } \} $( the set $ \{ {x } : {F( x) \cap U \neq \emptyset } \} $) is open.
Note that if a mapping $ f: X \rightarrow Y $ is regarded as a set-valued mapping $ F : X \rightarrow 2 ^ {Y} $, $ F( x) = \{ f( x) \} $, then $ F $ is lower semi-continuous if and only if $ f $ is lower semi-continuous; and $ F $ is upper semi-continuous if and only if $ f $ is upper semi-continuous.
References
[a1] | R. Engelking, "General topology" , Heldermann (1989) |
Semi-continuous mapping. Encyclopedia of Mathematics. URL: http://encyclopediaofmath.org/index.php?title=Semi-continuous_mapping&oldid=41325