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Hilbert_projection_theorem abstract "In mathematics, the Hilbert projection theorem is a famous result of convex analysis that says that for every point in a Hilbert space and every closed convex , there exists a unique point for which is minimized over . This is, in particular, true for any closed subspace of . In that case, a necessary and sufficient condition for is that the vector be orthogonal to .".
Hilbert_projection_theorem wikiPageID "9644792".
Hilbert_projection_theorem wikiPageRevisionID "604523744".
Hilbert_projection_theorem hasPhotoCollection Hilbert_projection_theorem.
Hilbert_projection_theorem subject Category:Convex_analysis.
Hilbert_projection_theorem subject Category:Theorems_in_functional_analysis.
Hilbert_projection_theorem type Abstraction100002137.
Hilbert_projection_theorem type Communication100033020.
Hilbert_projection_theorem type Message106598915.
Hilbert_projection_theorem type Proposition106750804.
Hilbert_projection_theorem type Statement106722453.
Hilbert_projection_theorem type Theorem106752293.
Hilbert_projection_theorem type TheoremsInFunctionalAnalysis.
Hilbert_projection_theorem comment "In mathematics, the Hilbert projection theorem is a famous result of convex analysis that says that for every point in a Hilbert space and every closed convex , there exists a unique point for which is minimized over . This is, in particular, true for any closed subspace of . In that case, a necessary and sufficient condition for is that the vector be orthogonal to .".
Hilbert_projection_theorem label "Hilbert projection theorem".
Hilbert_projection_theorem label "Teorema della proiezione".
Hilbert_projection_theorem label "Théorème de projection sur un convexe fermé".
Hilbert_projection_theorem sameAs Théorème_de_projection_sur_un_convexe_fermé.
Hilbert_projection_theorem sameAs Teorema_della_proiezione.
Hilbert_projection_theorem sameAs m.02pmy6q.
Hilbert_projection_theorem sameAs Q3527215.
Hilbert_projection_theorem sameAs Q3527215.
Hilbert_projection_theorem sameAs Hilbert_projection_theorem.
Hilbert_projection_theorem wasDerivedFrom Hilbert_projection_theorem?oldid=604523744.
Hilbert_projection_theorem isPrimaryTopicOf Hilbert_projection_theorem.