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Spectral Inclusion and Pollution for a Class of Dissipative Perturbations

Spectral inclusion and spectral pollution results are proved for sequences of linear operators of the form $T_0 + i γs_n$ on a Hilbert space, where $s_n$ is strongly convergent to the identity operator and $γ> 0$. We work in both an abstract setting and a more concrete Sturm-Liouville framework. The results provide rigorous justification for a method of computing eigenvalues in spectral gaps.

preprint2021arXivOpen access
Alexei Stepanenko
math.SP
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Alexei Stepanenko

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