About: Lebesgue's lemma

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For Lebesgue's lemma for open covers of compact spaces in topology see Lebesgue's number lemma In mathematics, Lebesgue's lemma is an important statement in approximation theory. It provides a bound for the projection error, controlling the error of approximation by a linear subspace based on a linear projection relative to the optimal error together with the operator norm of the projection.

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rdfs:label	Lebega lemo (eo) Lemme de Lebesgue (fr) Lebesgue's lemma (en)
rdfs:comment	En matematiko, lebega lemo estas grava propozicio en . Ĝi donas baron por la projekcia eraro. (eo) For Lebesgue's lemma for open covers of compact spaces in topology see Lebesgue's number lemma In mathematics, Lebesgue's lemma is an important statement in approximation theory. It provides a bound for the projection error, controlling the error of approximation by a linear subspace based on a linear projection relative to the optimal error together with the operator norm of the projection. (en) En mathématiques, le lemme de Lebesgue est un résultat important en théorie de l'approximation. Il permet d'obtenir une borne sur l'erreur de projection. (fr)
dcterms:subject	Approximation theory Lemmas in analysis
Wikipage page ID	2069644 (xsd:integer)
Wikipage revision ID	1109130385 (xsd:integer)
Link from a Wikipage to another Wikipage	Approximation theory Approximation theory Mathematics Operator norm Triangle inequality Lebesgue's number lemma Lebesgue constant (interpolation) Projection (linear algebra) Lemmas in analysis Normed vector space Springer-Verlag
sameAs	Lebesgue's lemma Lebesgue's lemma Lebesgue's lemma Lebesgue's lemma Lebesgue's lemma Lebesgue's lemma
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has abstract	En matematiko, lebega lemo estas grava propozicio en . Ĝi donas baron por la projekcia eraro. (eo) For Lebesgue's lemma for open covers of compact spaces in topology see Lebesgue's number lemma In mathematics, Lebesgue's lemma is an important statement in approximation theory. It provides a bound for the projection error, controlling the error of approximation by a linear subspace based on a linear projection relative to the optimal error together with the operator norm of the projection. (en) En mathématiques, le lemme de Lebesgue est un résultat important en théorie de l'approximation. Il permet d'obtenir une borne sur l'erreur de projection. (fr)
gold:hypernym	Statement
prov:wasDerivedFrom	wikipedia-en:Lebesgue's_lemma?oldid=1109130385&ns=0
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foaf:isPrimaryTopicOf	wikipedia-en:Lebesgue's_lemma
is Link from a Wikipage to another Wikipage of	List of numerical analysis topics Henri Lebesgue Lebesgue constant Polynomial interpolation List of things named after Henri Lebesgue Lebesgue lemma
is Wikipage redirect of	Lebesgue lemma
is foaf:primaryTopic of	wikipedia-en:Lebesgue's_lemma

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