Fractional Inversion in Krylov Space
High Energy Physics - Lattice
2011-08-04 v1
Abstract
The fractional inverse (real ) of a matrix is expanded in a series of Gegenbauer polynomials. If the spectrum of is confined to an ellipse not including the origin, convergence is exponential, with the same rate as for Chebyshev inversion. The approximants can be improved recursively and lead to an iterative solver for in Krylov space. In case of , the expansion is in terms of Legendre polynomials, and rigorous bounds for the truncation error are derived.
Cite
@article{arxiv.hep-lat/9805030,
title = {Fractional Inversion in Krylov Space},
author = {B. Bunk},
journal= {arXiv preprint arXiv:hep-lat/9805030},
year = {2011}
}
Comments
Contribution to LAT97 proceedings, 3 pages