A Resolvent Criterion for Normality
Given a normal matrix $A$ and an arbitrary square matrix $B$ (not necessarily of the same size), what relationships between $A$ and $B$, if any, guarantee that $B$ is also a normal matrix? We provide an answer to this question in terms of pseudospectra and norm behavior. In doing so, we prove that a...
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| Zusammenfassung: | Given a normal matrix $A$ and an arbitrary square matrix $B$ (not necessarily
of the same size), what relationships between $A$ and $B$, if any, guarantee
that $B$ is also a normal matrix? We provide an answer to this question in
terms of pseudospectra and norm behavior. In doing so, we prove that a certain
distance formula, known to be a necessary condition for normality, is in fact
sufficient and demonstrates that the spectrum of a matrix can be used to
recover the spectral norm of its resolvent precisely when the matrix is normal.
These results lead to new normality criteria and other interesting
consequences. |
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| DOI: | 10.48550/arxiv.1707.05469 |