Rapidly convergent series expansions for a class of resolvents

Abstract

Following advances in the abstract theory of composites, we develop rapidly converging series expansions about z=∞ for the resolvent R(z)=[z I- P Q P]-1 where Q is an orthogonal projection and P is such that P P is an orthogonal projection. It is assumed that the spectrum of P Q P lies within the interval [z-,z+] for some known z+≤ 1 and z-≥ 0 and that the actions of the projections Q and P P are easy to compute. The series converges in the entire z-plane excluding the cut [z-,z+]. It is obtained using subspace substitution, where the desired resolvent is tied to a resolvent in a larger space and Q gets replaced by a projection Q that is no longer orthogonal. When z is real the rate of convergence of the new method matches that of the conjugate gradient method.

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