Difference between revisions of "Whitney mapping"
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| − | 2) | + | Let $ X $ |
| + | be a compact [[Hausdorff space|Hausdorff space]]. The [[hyperspace]] of $ X $ | ||
| + | is denoted by $ 2 ^ {X} $; | ||
| + | the subspace of $ 2 ^ {X} $, | ||
| + | consisting of all sub-continua of $ X $ | ||
| + | is denoted by $ C ( X ) $. | ||
| + | A Whitney mapping of $ X $ | ||
| + | is a real-valued continuous function $ w $ | ||
| + | on $ 2 ^ {X} $( | ||
| + | or on $ C ( X ) $) | ||
| + | with the following properties: | ||
| − | + | 1) $ w ( \{ x \} ) = 0 $ | |
| + | for each $ x \in X $; | ||
| − | + | 2) if $ A $ | |
| + | and $ B $ | ||
| + | are in the domain of $ w $ | ||
| + | and if $ A $ | ||
| + | is a proper subset of $ B $, | ||
| + | then $ w ( A ) < w ( B ) $. | ||
| − | + | A set of type $ w ^ {- 1 } ( t ) $, | |
| + | for $ 0 \leq t < w ( tX ) $, | ||
| + | is called a Whitney level. | ||
| − | + | The existence of a Whitney function on $ 2 ^ {X} $ | |
| + | implies that $ X $ | ||
| + | is a $ G _ \delta $- | ||
| + | subset of its hyperspace, which in turn implies that $ X $ | ||
| + | is metrizable (cf. also [[Metrizable space|Metrizable space]]). One of the simplest constructions of a Whitney mapping for a compact metrizable space $ X $ | ||
| + | is as follows. Let $ {\mathcal O} $ | ||
| + | be a countable open base of $ X $, | ||
| + | and, for each pair $ U,V \in {\mathcal O} $ | ||
| + | such that $ { \mathop{\rm Cl} } ( U ) \subseteq V $, | ||
| + | fix a mapping $ f : X \rightarrow {[0,1] } $ | ||
| + | which equals $ 0 $ | ||
| + | on $ U $ | ||
| + | and $ 1 $ | ||
| + | outside $ V $. | ||
| + | Enumerate these functions as $ ( f _ {n} ) _ {n = 1 } ^ \infty $ | ||
| + | and let | ||
| − | A Whitney property is a topological property | + | $$ |
| + | w ( A ) = \sum _ {n = 1 } ^ \infty 2 ^ {- n } { \mathop{\rm diam} } f _ {n} ( A ) . | ||
| + | $$ | ||
| + | |||
| + | Below it is assumed that all spaces are metric continua. Whitney functions have been developed as a fundamental tool in continua theory. Their first use in this context was involved with order arcs in $ 2 ^ {X} $, | ||
| + | and led to a proof that $ 2 ^ {X} $ | ||
| + | is acyclic and that both $ C ( X ) $ | ||
| + | and $ 2 ^ {X} $ | ||
| + | are even contractible if $ X $ | ||
| + | is Peanian (1942). Later on they became a subject of study in their own right. | ||
| + | |||
| + | A Whitney property is a topological property $ {\mathcal P} $ | ||
| + | such that if a metric continuum $ X $ | ||
| + | has $ {\mathcal P} $, | ||
| + | then so does each Whitney level of it in $ C ( X ) $. | ||
| + | Examples are: being a (locally connected) continuum; being a hereditarily indecomposable continuum; being a (pseudo-) arc or a circle; etc. Counterexamples are: being contractible; being acyclic in Alexander–Čech cohomology; being homogeneous; being a Hilbert cube. | ||
Whitney functions were introduced by H. Whitney [[#References|[a4]]] in 1933 in a different context. They were first used by J.L. Kelley [[#References|[a2]]] to study hyperspaces. Every metric continuum can occur as a Whitney level [[#References|[a1]]]. For an account of continua theory see [[#References|[a3]]]. | Whitney functions were introduced by H. Whitney [[#References|[a4]]] in 1933 in a different context. They were first used by J.L. Kelley [[#References|[a2]]] to study hyperspaces. Every metric continuum can occur as a Whitney level [[#References|[a1]]]. For an account of continua theory see [[#References|[a3]]]. | ||
Latest revision as of 08:29, 6 June 2020
Let $ X $
be a compact Hausdorff space. The hyperspace of $ X $
is denoted by $ 2 ^ {X} $;
the subspace of $ 2 ^ {X} $,
consisting of all sub-continua of $ X $
is denoted by $ C ( X ) $.
A Whitney mapping of $ X $
is a real-valued continuous function $ w $
on $ 2 ^ {X} $(
or on $ C ( X ) $)
with the following properties:
1) $ w ( \{ x \} ) = 0 $ for each $ x \in X $;
2) if $ A $ and $ B $ are in the domain of $ w $ and if $ A $ is a proper subset of $ B $, then $ w ( A ) < w ( B ) $.
A set of type $ w ^ {- 1 } ( t ) $, for $ 0 \leq t < w ( tX ) $, is called a Whitney level.
The existence of a Whitney function on $ 2 ^ {X} $ implies that $ X $ is a $ G _ \delta $- subset of its hyperspace, which in turn implies that $ X $ is metrizable (cf. also Metrizable space). One of the simplest constructions of a Whitney mapping for a compact metrizable space $ X $ is as follows. Let $ {\mathcal O} $ be a countable open base of $ X $, and, for each pair $ U,V \in {\mathcal O} $ such that $ { \mathop{\rm Cl} } ( U ) \subseteq V $, fix a mapping $ f : X \rightarrow {[0,1] } $ which equals $ 0 $ on $ U $ and $ 1 $ outside $ V $. Enumerate these functions as $ ( f _ {n} ) _ {n = 1 } ^ \infty $ and let
$$ w ( A ) = \sum _ {n = 1 } ^ \infty 2 ^ {- n } { \mathop{\rm diam} } f _ {n} ( A ) . $$
Below it is assumed that all spaces are metric continua. Whitney functions have been developed as a fundamental tool in continua theory. Their first use in this context was involved with order arcs in $ 2 ^ {X} $, and led to a proof that $ 2 ^ {X} $ is acyclic and that both $ C ( X ) $ and $ 2 ^ {X} $ are even contractible if $ X $ is Peanian (1942). Later on they became a subject of study in their own right.
A Whitney property is a topological property $ {\mathcal P} $ such that if a metric continuum $ X $ has $ {\mathcal P} $, then so does each Whitney level of it in $ C ( X ) $. Examples are: being a (locally connected) continuum; being a hereditarily indecomposable continuum; being a (pseudo-) arc or a circle; etc. Counterexamples are: being contractible; being acyclic in Alexander–Čech cohomology; being homogeneous; being a Hilbert cube.
Whitney functions were introduced by H. Whitney [a4] in 1933 in a different context. They were first used by J.L. Kelley [a2] to study hyperspaces. Every metric continuum can occur as a Whitney level [a1]. For an account of continua theory see [a3].
References
| [a1] | W.J. Charatonik, "Continua as positive Whitney levels" Proc. Amer. Math. Soc. , 118 (1993) pp. 1351–1352 |
| [a2] | J.L. Kelley, "Hyperspaces of a continuum" Trans. Amer. Math. Soc. , 52 (1942) pp. 22–36 |
| [a3] | S.B. Nadler, "Hyperspaces of sets" , M. Dekker (1978) |
| [a4] | H. Whitney, "Regular families of curves" Ann. of Math. , 2 (1933) pp. 244–270 |
How to Cite This Entry:
Whitney mapping. Encyclopedia of Mathematics. URL: http://encyclopediaofmath.org/index.php?title=Whitney_mapping&oldid=49212
Whitney mapping. Encyclopedia of Mathematics. URL: http://encyclopediaofmath.org/index.php?title=Whitney_mapping&oldid=49212
This article was adapted from an original article by M. van de Vel (originator), which appeared in Encyclopedia of Mathematics - ISBN 1402006098. See original article