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- Calkin_correspondence abstract "In mathematics, the Calkin correspondence, named after mathematician John Williams Calkin, is a bijective correspondence between two-sided ideals of bounded linear operators of a separable infinite-dimensional Hilbert space and Calkin sequence spaces (also called rearrangement invariant sequence spaces). The correspondence is implemented by mapping an operator to its singular value sequence.It originated from John von Neumann's study of symmetric norms on matrix algebras. It provides a fundamental classification and tool for the study of two-sided ideals of compact operators and their traces, by reducing problems about operator spaces to (more resolvable) problems on sequence spaces.".
- Calkin_correspondence wikiPageExternalLink 177778.
- Calkin_correspondence wikiPageID "40116557".
- Calkin_correspondence wikiPageLength "5642".
- Calkin_correspondence wikiPageOutDegree "25".
- Calkin_correspondence wikiPageRevisionID "664002477".
- Calkin_correspondence wikiPageWikiLink Bra–ket_notation.
- Calkin_correspondence wikiPageWikiLink Category:Hilbert_space.
- Calkin_correspondence wikiPageWikiLink Category:Operator_algebras.
- Calkin_correspondence wikiPageWikiLink Category:Von_Neumann_algebras.
- Calkin_correspondence wikiPageWikiLink Compact_operator.
- Calkin_correspondence wikiPageWikiLink Finite-rank_operator.
- Calkin_correspondence wikiPageWikiLink Hilbert_space.
- Calkin_correspondence wikiPageWikiLink Ideal_(ring_theory).
- Calkin_correspondence wikiPageWikiLink John_von_Neumann.
- Calkin_correspondence wikiPageWikiLink Linear_algebra.
- Calkin_correspondence wikiPageWikiLink Linear_map.
- Calkin_correspondence wikiPageWikiLink Linear_operator.
- Calkin_correspondence wikiPageWikiLink Linear_operators.
- Calkin_correspondence wikiPageWikiLink Lorentz_space.
- Calkin_correspondence wikiPageWikiLink Lp_space.
- Calkin_correspondence wikiPageWikiLink Schatten_class_operator.
- Calkin_correspondence wikiPageWikiLink Sequence_space.
- Calkin_correspondence wikiPageWikiLink Singular_trace.
- Calkin_correspondence wikiPageWikiLink Singular_value.
- Calkin_correspondence wikiPageWikiLinkText "Calkin correspondence".
- Calkin_correspondence wikiPageWikiLinkText "correspondence".
- Calkin_correspondence hasPhotoCollection Calkin_correspondence.
- Calkin_correspondence wikiPageUsesTemplate Template:=.
- Calkin_correspondence wikiPageUsesTemplate Template:Cite_book.
- Calkin_correspondence wikiPageUsesTemplate Template:ILL.
- Calkin_correspondence wikiPageUsesTemplate Template:Reflist.
- Calkin_correspondence subject Category:Hilbert_space.
- Calkin_correspondence subject Category:Operator_algebras.
- Calkin_correspondence subject Category:Von_Neumann_algebras.
- Calkin_correspondence hypernym Correspondence.
- Calkin_correspondence type Organisation.
- Calkin_correspondence comment "In mathematics, the Calkin correspondence, named after mathematician John Williams Calkin, is a bijective correspondence between two-sided ideals of bounded linear operators of a separable infinite-dimensional Hilbert space and Calkin sequence spaces (also called rearrangement invariant sequence spaces). The correspondence is implemented by mapping an operator to its singular value sequence.It originated from John von Neumann's study of symmetric norms on matrix algebras.".
- Calkin_correspondence label "Calkin correspondence".
- Calkin_correspondence sameAs m.0x1vh25.
- Calkin_correspondence sameAs Q17005991.
- Calkin_correspondence sameAs Q17005991.
- Calkin_correspondence wasDerivedFrom Calkin_correspondence?oldid=664002477.
- Calkin_correspondence isPrimaryTopicOf Calkin_correspondence.