Block-Diagonal Preconditioning for Optimal Control Problems Constrained by PDEs with Uncertain Inputs

Benner, Peter; Onwunta, Akwum; Stoll, Martin

doi:10.1137/15m1018502

Cited by 34 publications

(39 citation statements)

References 25 publications

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“…discretization via finite elements on possibly irregular domains. We aim to base our approaches for these applications on recent results presented in [9,7]. …”

Section: Discussionmentioning

confidence: 99%

“…More reliable is the Krylov-plus-inverted-Krylov (KPIK) method, first developed in [24,80] for Lyapunov equations and later adapted for the case of Sylvester equations [81]. This method approximates the solution of the Sylvester equation in an extended Krylov subspace that involves two sequences with each of the system matrices C α and 1 √ γ I n − L in A. Additionally, the sequence requires the inverse or approximate inverse of both C α and 1 √ γ I n − L from (8) and (9). Since they are Toeplitz matrices, we can employ fast iterative solvers using circulant preconditioners, following [13].…”

Section: Preconditioningmentioning

confidence: 99%

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Fast tensor product solvers for optimization problems with fractional differential equations as constraints

Dolgov

Pearson

Savostyanov

et al. 2016

Applied Mathematics and Computation

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Fractional differential equations have recently received much attention within computational mathematics and applied science, and their numerical treatment is an important research area as such equations pose substantial challenges to existing algorithms. An optimization problem with constraints given by fractional differential equations is considered, which in its discretized form leads to a high-dimensional tensor equation. To reduce the computation time and storage, the solution is sought in the tensor-train format. We compare three types of solution strategies that employ sophisticated iterative techniques using either preconditioned Krylov solvers or tailored alternating schemes. The competitiveness of these approaches is presented using several examples with constant and variable coefficients.

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“…discretization via finite elements on possibly irregular domains. We aim to base our approaches for these applications on recent results presented in [9,7]. …”

Section: Discussionmentioning

confidence: 99%

Section: Preconditioningmentioning

confidence: 99%

Fast tensor product solvers for optimization problems with fractional differential equations as constraints

Dolgov

Pearson

Savostyanov

et al. 2016

Applied Mathematics and Computation

Self Cite

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“…(e) Robust stochastic control, see [4,5,13,14,15,36,45]: Minimize the expected cost E[J(u, y(u), a)] by a stochastic optimal control.…”

Section: Introductionmentioning

confidence: 99%

Multilevel Monte Carlo Analysis for Optimal Control of Elliptic PDEs with Random Coefficients

Ali¹,

Ullmann²,

Hinze³

2017

SIAM/ASA J. Uncertainty Quantification

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This work is motivated by the need to study the impact of data uncertainties and material imperfections on the solution to optimal control problems constrained by partial differential equations. We consider a pathwise optimal control problem constrained by a diffusion equation with random coefficient together with box constraints for the control. For each realization of the diffusion coefficient we solve an optimal control problem using the variational discretization [M. Hinze, Comput. Optim. Appl., 30 (2005), pp. 45-61]. Our framework allows for lognormal coefficients whose realizations are not uniformly bounded away from zero and infinity. We establish finite element error bounds for the pathwise optimal controls. This analysis is nontrivial due to the limited spatial regularity and the lack of uniform ellipticity and boundedness of the diffusion operator. We apply the error bounds to prove convergence of a multilevel Monte Carlo estimator for the expected value of the pathwise optimal controls. In addition we analyze the computational complexity of the multilevel estimator. We perform numerical experiments in 2D space to confirm the convergence result and the complexity bound.

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“…In recent years, PDE-constrained optimal control and optimization problems under uncertainty have become important areas of research and have drawn increasing attention, e.g., [1,2,4,5,[9][10][11]16,17] and references therein. Computational challenges arise when the random parameters are high dimensional and the governing state equations are complex PDEs.…”

Section: Introductionmentioning

confidence: 99%

Taylor approximation for PDE‐constrained optimization under uncertainty: Application to turbulent jet flow

Chen

Villa

Ghattas

2018

Proc Appl Math and Mech

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We present a scalable method for PDE-constrained optimization under high-dimensional uncertainty. The method is based on a functional Taylor approximation of the cost functional with respect to (w.r.t.) the random parameter field. We consider a risk-averse optimization formulation via a mean-variance measure for the control objective. A quadratic Taylor approximation of the control objective gives rise to a function involving the trace of the Hessian of the objective w.r.t. the random parameter, preconditioned by the covariance operator. We apply a randomized SVD algorithm to estimate the trace, which is demonstrated to be scalable w.r.t. the parameter dimension, i.e., the number of PDE solves is independent of the parameter dimension and depends only on the decay of the eigenvalues of the covariance-preconditioned Hessian (which is typically dimensionindependent). We solve the resulting generalized eigenproblem-constrained optimization problem by a quasi-Newton method. We apply our method to a RANS turbulence model with an infinite-dimensional random field representing model inadequacy, and demonstrate scalability on discretized problems with parameter dimensions up to one million.

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Block-Diagonal Preconditioning for Optimal Control Problems Constrained by PDEs with Uncertain Inputs

Cited by 34 publications

References 25 publications

Fast tensor product solvers for optimization problems with fractional differential equations as constraints

Fast tensor product solvers for optimization problems with fractional differential equations as constraints

Multilevel Monte Carlo Analysis for Optimal Control of Elliptic PDEs with Random Coefficients

Taylor approximation for PDE‐constrained optimization under uncertainty: Application to turbulent jet flow

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