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- AW*-algebra abstract "In mathematics, an AW*-algebra is an algebraic generalization of a W*-algebra. They were introduced by Irving Kaplansky in 1951. As operator algebras, von Neumann algebras, among all C*-algebras, are typically handled using one of two means: they are the dual space of some Banach space, and they are determined to a large extent by their projections. The idea behind AW*-algebras is to forgo the former, topological, condition, and use only the latter, algebraic, condition.".
- AW*-algebra wikiPageID "39435930".
- AW*-algebra wikiPageLength "3652".
- AW*-algebra wikiPageOutDegree "21".
- AW*-algebra wikiPageRevisionID "700738263".
- AW*-algebra wikiPageWikiLink Annihilator_(ring_theory).
- AW*-algebra wikiPageWikiLink Baer_ring.
- AW*-algebra wikiPageWikiLink Banach_space.
- AW*-algebra wikiPageWikiLink Boolean_algebra.
- AW*-algebra wikiPageWikiLink C*-algebra.
- AW*-algebra wikiPageWikiLink Category:C*-algebras.
- AW*-algebra wikiPageWikiLink Category:Operator_theory.
- AW*-algebra wikiPageWikiLink Complete_lattice.
- AW*-algebra wikiPageWikiLink Extremally_disconnected_space.
- AW*-algebra wikiPageWikiLink Idempotent_element.
- AW*-algebra wikiPageWikiLink Irving_Kaplansky.
- AW*-algebra wikiPageWikiLink Mathematics.
- AW*-algebra wikiPageWikiLink Normal_matrix.
- AW*-algebra wikiPageWikiLink Operator_algebra.
- AW*-algebra wikiPageWikiLink Polar_decomposition.
- AW*-algebra wikiPageWikiLink Projection_(linear_algebra).
- AW*-algebra wikiPageWikiLink Self-adjoint.
- AW*-algebra wikiPageWikiLink Spectrum_of_a_C*-algebra.
- AW*-algebra wikiPageWikiLink Stone_duality.
- AW*-algebra wikiPageWikiLink Von_Neumann_algebra.
- AW*-algebra wikiPageWikiLinkText "AW*-algebra".
- AW*-algebra wikiPageUsesTemplate Template:Reflist.
- AW*-algebra subject Category:C*-algebras.
- AW*-algebra subject Category:Operator_theory.
- AW*-algebra hypernym Generalization.
- AW*-algebra comment "In mathematics, an AW*-algebra is an algebraic generalization of a W*-algebra. They were introduced by Irving Kaplansky in 1951. As operator algebras, von Neumann algebras, among all C*-algebras, are typically handled using one of two means: they are the dual space of some Banach space, and they are determined to a large extent by their projections. The idea behind AW*-algebras is to forgo the former, topological, condition, and use only the latter, algebraic, condition.".
- AW*-algebra label "AW*-algebra".
- AW*-algebra sameAs Q17002576.
- AW*-algebra sameAs m.0vpy3nw.
- AW*-algebra sameAs Q17002576.
- AW*-algebra wasDerivedFrom AW*-algebra?oldid=700738263.
- AW*-algebra isPrimaryTopicOf AW*-algebra.