arXiv:1708.08633 Abstract | arXiv Analytics

arXiv:1708.08633 [math.FA]Abstract References Reviews Resources

Remarks on the Crouzeix-Palencia proof that the numerical range is a $(1+\sqrt2)$-spectral set

Published 2017-08-29Version 1

Crouzeix and Palencia recently showed that the numerical range of a Hilbert-space operator is a $(1+\sqrt2)$-spectral set for the operator. One of the principal ingredients of their proof can be formulated as an abstract functional-analysis lemma. We give a new short proof of the lemma and show that, in the context of this lemma, the constant $(1+\sqrt2)$ is sharp.

Comments: 4 pages

Categories: math.FA, math.NA

Subjects: 47A25, 47A12

Keywords: spectral set, numerical range, crouzeix-palencia proof, abstract functional-analysis lemma, hilbert-space operator

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arXiv:1708.08633 [math.FA]Abstract References Reviews Resources

Remarks on the Crouzeix-Palencia proof that the numerical range is a $(1+\sqrt2)$-spectral set

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Remarks on the Crouzeix-Palencia proof that the numerical range is a $(1+\sqrt2)$-spectral set

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arXiv:1708.08633 [math.FA]Abstract References Reviews Resources