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Inverse iteration is one of the most widely used algorithms in practical linear algebra but an understanding of its main numerical properties has developed piecemeal over the last thirty years: a major source of misunderstanding is that it requires the solution of very ill-conditioned systems of equations. We describe closely related algorithms which avoid these ill-conditioned systems and explain why the standard inverse iteration algorithm may nevertheless be preferable. The discussion covers the generalized problems Ax - Bx and (Aᵣ ʳ + + A₁ + A₀) x = 0 in addition to the standard problem. The case when A - I is almost singular to the working accuracy has only recently been understood, mainly through the work of Varah. The final sections give a detailed account of the current state of this work, concluding with an analysis based on the singular value decomposition.
Peters et al. (Sun,) studied this question.