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Line 8: ==Overview== Operator algebras can be used to study arbitrary sets of operators with little algebraic relation ''simultaneously''. From this point of view, operator algebras can be regarded as a generalization of [[spectral theory]] of a single operator. In general operator algebras are [[noncommutative ring\|non-commutative]] [[Ring (mathematics)\|rings]]. Line 24 ⟶ 25: ==See also== [[ {{annotated link\|Banach algebra]]}} [[Topologies on the set of operators on a Hilbert space]]▼ [[ {{annotated link\|Matrix mechanics]]}} ▲[[ {{annotated link\|Topologies on the set of operators on a Hilbert space]]}} [[ {{annotated link\|Vertex operator algebra]]}} ==References== ~~{{Reflist}}~~ {{reflist}} == Further reading ==▼ {{cite book▼ ▲== Further reading == ▲* {{cite book \| last = Blackadar \| first = Bruce Line 43 ⟶ 47: * M. Takesaki, ''Theory of Operator Algebras I'', Springer, 2001. {{Spectral theory}} {{Functional analysis}} {{Banach spaces}} {{Industrial and applied mathematics}} {{Authority control}} [[Category:Operator theory]]▼ [[Category:Functional analysis]] [[Category:Operator algebras]] ▲[[Category:Operator theory]]

Operator algebra: Difference between revisions