Linear maps on *-algebras acting on orthogonal elements like derivations or anti-derivations
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Publication:5087868
DOI10.2298/FIL1813543GzbMath1499.46112OpenAlexW2941157764MaRDI QIDQ5087868
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Publication date: 4 July 2022
Published in: Filomat (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.2298/fil1813543g
Commutators, derivations, elementary operators, etc. (47B47) General theory of (C^*)-algebras (46L05) Linear preserver problems (15A86)
Related Items (11)
Characterizing linear maps of standard operator algebras through orthogonality ⋮ Characterizing linear mappings through zero products or zero Jordan products ⋮ Anti-derivable linear maps at zero on standard operator algebras ⋮ Lie centralizers at zero products on a class of operator algebras ⋮ Linear maps which are anti-derivable at zero ⋮ Linear maps on \(C^\star\)-algebras behaving like (anti-)derivations at orthogonal elements ⋮ Unnamed Item ⋮ A linear preserver problem on maps which are triple derivable at orthogonal pairs ⋮ Ternary derivations of nest algebras ⋮ Characterizations of \({*}\) and \({*}\)-left derivable mappings on some algebras ⋮ Characterizations of \(\ast\)-antiderivable mappings on operator algebras
Cites Work
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- ON RINGS DETERMINED BY ZERO PRODUCTS
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- Characterizing Jordan maps on C*-algebras through zero products
- Multiplication algebra and maps determined by zero products
- Commutators in Properly Infinite Von Neumann Algebras
- Characterizing homomorphisms, derivations and multipliers in rings with idempotents
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