Luís Carvalho, Cristina Diogo, Sérgio Mendes, Helena Soares
Published 2022-12-22Version 1
In this note we characterize the essential numerical range of a block diagonal o\-pe\-ra\-tor $T=\bigoplus_i T_i$ in terms of the numerical ranges $\{W(T_i)\}_i$ of its components. Specifically, the essential numerical range of $T$ is the convex hull of the limit superior of $\{W(T_i)\}_i$. This characterization can be simplified further. In fact, we prove the existence of a decomposition of $T$ for which the convex hull is not required.
The essential numerical range and a theorem of Simon on the absorption of eigenvalues
The numerical range of a class of periodic tridiagonal operators
The numerical range of some periodic tridiagonal operators is the convex hull of the numerical ranges of two finite matrices
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