Computing the norms of elementary operators

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University of Illinois Press

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Richard M. Timoney 'Computing the norms of elementary operators' in Illinois Journal of Mathematics, 47, 2003, pp 1207 - 1226

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We provide a direct proof that the Haagerup estimate on the completely bounded norm of elementary operators is best possible in the case of B(H) via a generalisation of a theorem of Stamp i. We show that for an elementary operator T of length `, the completely bounded norm is equal to the k-norm for k = `. A C*-algebra A has the property that the completely bounded norm of every elementary operator is the k-norm, if and only if A is either k-subhomogeneous or a k-subhomogeneous extension of an antiliminal C*-algebra.

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Publisher: University of Illinois Press
Type of material: Journal Article