Abstract
The purpose of this paper is to record some progress on the problem of determining which (bounded, linear) operators A on a separable Hilbert space H are commutators, in the sense that there exist bounded operators B and C on H satisfying A = BC — CB . It is thus natural to consider this paper as a continuation of the sequence (2; 3; 5). In §2 we show that many infinite diagonal matrices (with scalar entries) are commutators and that every weighted unilateral and bilateral shift is a commutator.
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CITATION STYLE
Brown, A., Halmos, P. R., & Pearcy, C. (1965). Commutators of Operators on Hilbert Space. Canadian Journal of Mathematics, 17, 695–708. https://doi.org/10.4153/cjm-1965-070-7
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