About: Multiplier algebra

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dbo:abstract	Die Multiplikatorenalgebra, in Anlehnung an die englische Bezeichnung auch Multiplier-Algebra genannt, ist ein Konzept aus der mathematischen Theorie der C-Algebren. Es handelt sich um die maximale Einbettung einer C-Algebra als wesentliches zweiseitiges Ideal in eine C-Algebra mit Einselement. (de) In mathematics, the multiplier algebra, denoted by M(A), of a C-algebra A is a unital C-algebra that is the largest unital C-algebra that contains A as an ideal in a "non-degenerate" way. It is the noncommutative generalization of Stone–Čech compactification. Multiplier algebras were introduced by . For example, if A is the C-algebra of compact operators on a separable Hilbert space, M(A) is B(H), the C-algebra of all bounded operators on H. (en)
dbo:wikiPageExternalLink	https://web.archive.org/web/20200220172805/http:/pdfs.semanticscholar.org/6fc8/e18b8f80e808b12cf2a446024d36dcb30555.pdf http://pdfs.semanticscholar.org/6fc8/e18b8f80e808b12cf2a446024d36dcb30555.pdf
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dbo:wikiPageWikiLink	dbr:Topologies_on_the_set_of_operators_on_a_Hilbert_space dbr:Mathematics dbr:Bounded_operator dbr:Corona_set dbr:Locally_compact dbr:Calkin_algebra dbr:Stone–Čech_compactification dbr:Compact_operator_on_Hilbert_space dbr:Ideal_(ring_theory) dbr:Idealizer dbr:Spectrum_of_a_C-algebra dbr:Noncommutative_topology dbr:Hausdorff_space dbr:Hilbert_C-module dbr:Isomorphism dbc:C-algebras dbr:C-algebra dbr:Seminorm dbr:Gelfand-Naimark_theorem dbr:Universal_property dbr:Vanish_at_infinity dbr:Transactions_of_the_American_Mathematical_Society
dbp:first	Gert K. (en)
dbp:id	m/m130260 (en)
dbp:last	Pedersen (en)
dbp:title	Multipliers of C*-algebras (en)
dbp:wikiPageUsesTemplate	dbt:Citation dbt:Harvtxt dbt:Eom
dcterms:subject	dbc:C*-algebras
gold:hypernym	dbr:Algebra
rdfs:comment	Die Multiplikatorenalgebra, in Anlehnung an die englische Bezeichnung auch Multiplier-Algebra genannt, ist ein Konzept aus der mathematischen Theorie der C-Algebren. Es handelt sich um die maximale Einbettung einer C-Algebra als wesentliches zweiseitiges Ideal in eine C-Algebra mit Einselement. (de) In mathematics, the multiplier algebra, denoted by M(A), of a C-algebra A is a unital C-algebra that is the largest unital C-algebra that contains A as an ideal in a "non-degenerate" way. It is the noncommutative generalization of Stone–Čech compactification. Multiplier algebras were introduced by . For example, if A is the C-algebra of compact operators on a separable Hilbert space, M(A) is B(H), the C-algebra of all bounded operators on H. (en)
rdfs:label	Multiplikatorenalgebra (de) Multiplier algebra (en)
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