http://debianws.lexgopc.com/wiki143/index.php?action=history&feed=atom&title=Radonifying_functionRadonifying function - Revision history2026-05-09T20:30:02ZRevision history for this page on the wikiMediaWiki 1.43.1http://debianws.lexgopc.com/wiki143/index.php?title=Radonifying_function&diff=3382523&oldid=previmported>Mgkrupa: /* See also */2023-02-02T04:50:27Z<p><span class="autocomment">See also</span></p>
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In [[measure theory]], a '''radonifying function''' (ultimately named after [[Johann Radon]]) between [[measurable space]]s is one that takes a [[cylinder set measure]] (CSM) on the first space to a true measure on the second space. It acquired its name because the [[pushforward measure]] on the second space was historically thought of as a [[Radon measure]].<br />
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==Definition==<br />
Given two [[separable space|separable]] [[Banach space]]s <math>E</math> and <math>G</math>, a CSM <math>\{ \mu_{T} | T \in \mathcal{A} (E) \}</math> on <math>E</math> and a [[continuous function|continuous]] [[linear map]] <math>\theta \in \mathrm{Lin} (E; G)</math>, we say that <math>\theta</math> is ''radonifying'' if the push forward CSM (see below) <math>\left\{ \left. \left( \theta_{*} (\mu_{\cdot}) \right)_{S} \right| S \in \mathcal{A} (G) \right\}</math> on <math>G</math> "is" a measure, i.e. there is a measure <math>\nu</math> on <math>G</math> such that<br />
::<math>\left( \theta_{*} (\mu_{\cdot}) \right)_{S} = S_{*} (\nu)</math><br />
for each <math>S \in \mathcal{A} (G)</math>, where <math>S_{*} (\nu)</math> is the usual push forward of the measure <math>\nu</math> by the linear map <math>S : G \to F_{S}</math>.<br />
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==Push forward of a CSM==<br />
Because the definition of a CSM on <math>G</math> requires that the maps in <math>\mathcal{A} (G)</math> be [[surjective]], the definition of the push forward for a CSM requires careful attention. The CSM<br />
::<math>\left\{ \left. \left( \theta_{*} (\mu_{\cdot}) \right)_{S} \right| S \in \mathcal{A} (G) \right\}</math><br />
is defined by<br />
::<math>\left( \theta_{*} (\mu_{\cdot}) \right)_{S} = \mu_{S \circ \theta}</math><br />
if the [[Function composition|composition]] <math>S \circ \theta : E \to F_{S}</math> is surjective. If <math>S \circ \theta</math> is not surjective, let <math>\tilde{F}</math> be the image of <math>S \circ \theta</math>, let <math>i : \tilde{F} \to F_{S}</math> be the [[inclusion map]], and define<br />
::<math>\left( \theta_{*} (\mu_{\cdot}) \right)_{S} = i_{*} \left( \mu_{\Sigma} \right)</math>,<br />
where <math>\Sigma : E \to \tilde{F}</math> (so <math>\Sigma \in \mathcal{A} (E)</math>) is such that <math>i \circ \Sigma = S \circ \theta</math>.<br />
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==See also==<br />
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* {{annotated link|Abstract Wiener space}}<br />
* {{annotated link|Classical Wiener space}}<br />
* {{annotated link|Sazonov's theorem}}<br />
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==References==<br />
<br />
{{reflist}}<br />
<br />
{{DEFAULTSORT:Radonifying Function}}<br />
<br />
{{Measure theory}}<br />
{{Analysis in topological vector spaces}}<br />
{{Functional analysis}}<br />
<br />
[[Category:Banach spaces]]<br />
[[Category:Measure theory]]<br />
[[Category:Types of functions]]</div>imported>Mgkrupa