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arxiv: 2010.09710 · v2 · pith:T5ORE3P6new · submitted 2020-10-19 · 🧮 math.NA · cs.NA

Twice is enough for dangerous eigenvalues

classification 🧮 math.NA cs.NA
keywords eigenvaluesrationalround-offdangerouseigenvalueenougherrorsfilter
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We analyze the stability of a class of eigensolvers that target interior eigenvalues with rational filters. We show that subspace iteration with a rational filter is robust even when an eigenvalue is near a filter's pole. These dangerous eigenvalues contribute to large round-off errors in the first iteration, but are self-correcting in later iterations. For matrices with orthogonal eigenvectors (e.g., real-symmetric or complex Hermitian), two iterations is enough to reduce round-off errors to the order of the unit-round off. In contrast, Krylov methods accelerated by rational filters with fixed poles typically fail to converge to unit round-off accuracy when an eigenvalue is close to a pole. In the context of Arnoldi with shift-and-invert enhancement, we demonstrate a simple restart strategy that recovers full precision in the target eigenpairs.

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