CHARACTERIZATION OF DERIVATIONS ON β(X) BY LOCAL ACTIONS
Let A be a unital algebra and M be a unital .A-bimodule. A linear map δ : A →M is said to be Jordan derivable at a nontrivial idempotent P ∈A if δ(A) o B + A o δ(B) =δ(A o B) for any A,B ∈ .4 with A o B = P, here A o B = AB + BA is the usual Jordan product. In this article, we show that if ,A = AlgA...
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| Published in | 数学物理学报:B辑英文版 Vol. 37; no. 3; pp. 668 - 678 |
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| Main Author | |
| Format | Journal Article |
| Language | English |
| Published |
2017
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| Online Access | Get full text |
| ISSN | 0252-9602 |
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| Summary: | Let A be a unital algebra and M be a unital .A-bimodule. A linear map δ : A →M is said to be Jordan derivable at a nontrivial idempotent P ∈A if δ(A) o B + A o δ(B) =δ(A o B) for any A,B ∈ .4 with A o B = P, here A o B = AB + BA is the usual Jordan product. In this article, we show that if ,A = AlgAN is a Hilbert space nest Mgebra and M = B(H), or A =M= B(X), then, a linear mapδ: A→M is Jordan derivable at a nontrivial projection P ∈ N or an arbitrary but fixed nontrivial idempotent P∈ B(X) if and only if it is a derivation. New equivalent characterization of derivations on these operator algebras was obtained. |
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| Bibliography: | Let A be a unital algebra and M be a unital .A-bimodule. A linear map δ : A →M is said to be Jordan derivable at a nontrivial idempotent P ∈A if δ(A) o B + A o δ(B) =δ(A o B) for any A,B ∈ .4 with A o B = P, here A o B = AB + BA is the usual Jordan product. In this article, we show that if ,A = AlgAN is a Hilbert space nest Mgebra and M = B(H), or A =M= B(X), then, a linear mapδ: A→M is Jordan derivable at a nontrivial projection P ∈ N or an arbitrary but fixed nontrivial idempotent P∈ B(X) if and only if it is a derivation. New equivalent characterization of derivations on these operator algebras was obtained. Derivations; triangular algebras; subspace lattice algebras; Jordan derivable maps 42-1227/O Tianjiao ,XUE Runling AN ,Jinchuan HOU(Department of Mathematics, Taiyuan University of Technology, Taiyuan 030024, China) |
| ISSN: | 0252-9602 |