A class of low-rank short recurrences for nonsymmetric linear matrix equations
Abstract
We propose a new class of short matrix recurrences for the solution of nonsymmetric linear equations of the type A1XB1+…+ApXBp=CDT. These iterative methods combine local subspace projection to speed up convergence with rank truncation strategies and randomization procedures to limit memory consumption. Computational experiments on a benchmark problem as well as a challenging discretized mixed formulation of a diffusion equation with random inputs illustrate the potential of the proposed methodology.
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