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- Banach_*-algebra abstract "A Banach *-algebra A is a Banach algebra over the field of complex numbers, together with a map * : A → A, called involution, that has the following properties: (x + y)* = x* + y* for all x, y in A. for every λ in C and every x in A; here, denotes the complex conjugate of λ. (xy)* = y* x* for all x, y in A. (x*)* = x for all x in A.In most natural examples, one also has that the involution is isometric, i.e. ||x*|| = ||x||,".
- Banach_*-algebra wikiPageID "9604643".
- Banach_*-algebra wikiPageRevisionID "606054291".
- Banach_*-algebra subject Category:Banach_algebras.
- Banach_*-algebra type Abstraction100002137.
- Banach_*-algebra type Algebra106012726.
- Banach_*-algebra type BanachAlgebras.
- Banach_*-algebra type Cognition100023271.
- Banach_*-algebra type Content105809192.
- Banach_*-algebra type Discipline105996646.
- Banach_*-algebra type KnowledgeDomain105999266.
- Banach_*-algebra type Mathematics106000644.
- Banach_*-algebra type PsychologicalFeature100023100.
- Banach_*-algebra type PureMathematics106003682.
- Banach_*-algebra type Science105999797.
- Banach_*-algebra comment "A Banach *-algebra A is a Banach algebra over the field of complex numbers, together with a map * : A → A, called involution, that has the following properties: (x + y)* = x* + y* for all x, y in A. for every λ in C and every x in A; here, denotes the complex conjugate of λ. (xy)* = y* x* for all x, y in A. (x*)* = x for all x in A.In most natural examples, one also has that the involution is isometric, i.e. ||x*|| = ||x||,".
- Banach_*-algebra label "Banach *-algebra".
- Banach_*-algebra sameAs m.0117wqfg.
- Banach_*-algebra sameAs Q16930464.
- Banach_*-algebra sameAs Q16930464.
- Banach_*-algebra sameAs Banach_*-algebra.
- Banach_*-algebra wasDerivedFrom Banach_*-algebra?oldid=606054291.
- Banach_*-algebra isPrimaryTopicOf Banach_*-algebra.