Affiliation:
1. Delft University of Technology, The Netherlands
Abstract
The IDR(
s
) method that is proposed in Sonneveld and van Gijzen [2008] is a very efficient limited memory method for solving large nonsymmetric systems of linear equations. IDR(
s
) is based on the induced dimension reduction theorem, that provides a way to construct subsequent residuals that lie in a sequence of shrinking subspaces. The IDR(
s
) algorithm that is given in Sonneveld and van Gijzen [2008] is a direct translation of the theorem into an algorithm. This translation is not unique. This article derives a new IDR(
s
) variant, that imposes (one-sided) biorthogonalization conditions on the iteration vectors. The resulting method has lower overhead in vector operations than the original IDR(
s
) algorithms. In exact arithmetic, both algorithms give the same residual at every (
s
+ 1)-st step, but the intermediate residuals and also the numerical properties differ. We show through numerical experiments that the new variant is more stable and more accurate than the original IDR(
s
) algorithm, and that it outperforms other state-of-the-art techniques for realistic test problems.
Publisher
Association for Computing Machinery (ACM)
Subject
Applied Mathematics,Software
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