Efficient cyclic reduction for QBDs with rank structured blocks
Numerical Analysis
2016-01-06 v1
Abstract
We provide effective algorithms for solving block tridiagonal block Toeplitz systems with quasiseparable blocks, as well as quadratic matrix equations with quasiseparable coefficients, based on cyclic reduction and on the technology of rank-structured matrices. The algorithms rely on the exponential decay of the singular values of the off-diagonal submatrices generated by cyclic reduction. We provide a formal proof of this decay in the Markovian framework. The results of the numerical experiments that we report confirm a significant speed up over the general algorithms, already starting with the moderately small size .
Cite
@article{arxiv.1601.00861,
title = {Efficient cyclic reduction for QBDs with rank structured blocks},
author = {Dario A. Bini and Stefano Massei and Leonardo Robol},
journal= {arXiv preprint arXiv:1601.00861},
year = {2016}
}