Commutator estimates in W*-factors
Abstract
Let M be a W*-factor and let S( M ) be the space of all measurable operators affiliated with M. It is shown that for any self-adjoint element a∈ S(M) there exists a scalar λ0∈R, such that for all > 0, there exists a unitary element u from M, satisfying |[a,u]| ≥ (1-)|a-λ01|. A corollary of this result is that for any derivation δ on M with the range in an ideal I⊂eqM, the derivation δ is inner, that is δ(·)=δa(·)=[a,·], and a∈ I. Similar results are also obtained for inner derivations on S(M).
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