2010 Lie derivable maps on
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Lie derivable maps on B ( X )
Abstract: Let X be a Banach space of dimension greater than 1. We prove that if a map δ :for any A, B ∈ B( X), then δ = D + τ , where D is an additive derivation of B( X) and the map τ : B( X) → FI vanishes at commutators [A, B].
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Cited by 33 publications
References 25 publications
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