q-Numerical Ranges and Spectral Sets

Abstract

We study spectral constants for convex domains containing the spectrum of an operator. We extend the Crouzeix--Palencia framework by obtaining bounds depending on a parameter γ and relating these bounds to geometric properties of and the numerical range W(A). We generalise the proof that the numerical range is a 1+2-spectral set to scaled q-numerical ranges. We also propose a generalisation of Crouzeix's Conjecture in the context of q-numerical ranges.

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