Abstract
In the present note, we study the problem of lifting poles in Calkin algebra on a separable infinite-dimensional complex Hilbert space H H . We show by an example that such lifting is not possible in general, and we prove that if zero is a pole of the resolvent of the image of an operator T T in the Calkin algebra, then there exists a compact operator K K for which zero is a pole of T + K T+K if and only if the index of T − λ T-\lambda is zero on a punctured neighbourhood of zero. Further, a useful characterization of poles in Calkin algebra in terms of essential ascent and descent is provided.
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