Bounded differential operators on Hilbert modules and derivation of structurable h∗-algebras
DOI10.1080/00927879308824711zbMath0791.46024OpenAlexW2016690336MaRDI QIDQ5287623
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Publication date: 17 August 1993
Published in: Communications in Algebra (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1080/00927879308824711
annihilatorHilbert modules\(H^*\)-algebrasgeneralized derivationsstructurable algebraLie subalgebra\(H^*\)-triplesdifferential operator on a left module over an associative algebra
Normed modules and Banach modules, topological modules (if not placed in 13-XX or 16-XX) (46H25) Nonassociative topological algebras (46H70) Automorphisms, derivations, other operators (nonassociative rings and algebras) (17A36)
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Cites Work
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- A characterization of ternary rings of operators
- Structurable \(H^*\)-algebras
- A class of nonassociative algebras with involution containing the class of Jordan algebras
- Simple and semisimple structurable algebras
- Structure theory for noncommutative Jordan \(H^ *\)-algebras
- A generalized Hilbert space
- The norm of a derivation
- A ternary algebra with applications to matrices and linear transformations
- BOUNDED DERIVATIONS OF JB* - TRIPLES
- Isomorphisms of H*-algebras
- Models of isotropic simple lie algebras
- A note on real H*-algebras
- Continuity of Derivations on H ∗ -Algebras
- Hilbert modules revisited: orthonormal bases and Hilbert-Schmidt operators
- The Structure of Hilbert Modules
- Continuity of Derivations and a Problem of Kaplansky
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