2010
DOI: 10.1137/090774082
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On Adaptive Choice of Shifts in Rational Krylov Subspace Reduction of Evolutionary Problems

Abstract: We compute u(t) = exp(−tA)ϕ using rational Krylov subspace reduction for 0 ≤ t < ∞, where u(t), ϕ ∈ R N and 0 < A = A * ∈ R N×N. A priori optimization of the rational Krylov subspaces for this problem was considered in [V. Druskin, L. Knizhnerman, and M. Zaslavsky, SIAM J. Sci. Comput., 31 (2009), pp. 3760-3780]. There was suggested an algorithm generating sequences of equidistributed shifts, which are asymptotically optimal for the cases with uniform spectral distributions. Here we develop a recursive greedy … Show more

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Cited by 70 publications
(82 citation statements)
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“…It was further developed in reduced basis models for elliptic PDEs in [218], the steady incompressible Navier-Stokes equations in [217], and parabolic PDEs in [111,112]. It has since been applied in conjunction with POD methods [61,122,230] and rational interpolation methods [79]. The key advantage of the greedy approach is that the search over the parameter space embodies the structure of the problem, so that the underlying system dynamics guide the selection of appropriate parameter samples.…”
Section: Adaptive Parameter Sampling Via Greedy Searchmentioning
confidence: 99%
“…It was further developed in reduced basis models for elliptic PDEs in [218], the steady incompressible Navier-Stokes equations in [217], and parabolic PDEs in [111,112]. It has since been applied in conjunction with POD methods [61,122,230] and rational interpolation methods [79]. The key advantage of the greedy approach is that the search over the parameter space embodies the structure of the problem, so that the underlying system dynamics guide the selection of appropriate parameter samples.…”
Section: Adaptive Parameter Sampling Via Greedy Searchmentioning
confidence: 99%
“…Note that, in contrast to the algorithms presented in [7,8], we do not require any estimation for the spectral interval of A; in fact, we will demonstrate in the following section that our algorithm performs well also for highly nonsymmetric and nonnormal matrices. A detailed analysis of this algorithm will be subject of future work.…”
Section: -------------------------------------------------mentioning
confidence: 97%
“…This choice is a straightforward adaption of a pole selection heuristic proposed in [7,8], where the nodal function has to be large on a negative real interval Γ and small on −Γ. In our case we do not have such a symmetry, but still we hope that our nodal rational function s n is large on Γ and small on some "relevant subset" of the numerical range of A (recall from above that s n (A)v is minimal!).…”
Section: Adaptive Pole Selectionmentioning
confidence: 99%
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“…In Druskin et al (2010) (for symmetric S) and (for general S), adaptive and parameter-free approaches for generating the shifts s were proposed. Both approaches require some knowledge of the spectrum of S. In , the first shift s 1 is chosen to be a rough estimate of either −Re min (θ) or −Re max (θ), where Re min (θ) and Re max (θ) denote the minimum and maximum real parts of the eigenvalues of S, respectively.…”
Section: Solve the Small Lyapunov Equationmentioning
confidence: 99%