Martin Stoll scite author profile

A molecular beam consisting of small helium clusters is diffracted from a 100 nm period transmission grating. The relative dimer intensities have been measured out to the 7th order and are used to determine the reduction of the effective slit width resulting from the finite size of the dimer. From a theoretical analysis of the data which also takes into account the van der Waals interaction with the grating bars, the bond length (mean internuclear distance) and the binding energy are found to be = 52+/-4 A and |E(b)| = 1. 1+0.3/-0.2 mK.

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Regularization-Robust Preconditioners for Time-Dependent PDE-Constrained Optimization Problems

Pearson

Stoll

Wathen

2012

SIAM J. Matrix Anal. & Appl.

107

150

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In this article, we motivate, derive and test effective preconditioners to be used with the Minres algorithm for solving a number of saddle point systems, which arise in PDE constrained optimization problems. We consider the distributed control problem involving the heat equation with two different functionals, and the Neumann boundary control problem involving Poisson's equation and the heat equation. Crucial to the effectiveness of our preconditioners in each case is an effective approximation of the Schur complement of the matrix system. In each case, we state the problem being solved, propose the preconditioning approach, prove relevant eigenvalue bounds, and provide numerical results which demonstrate that our solvers are effective for a wide range of regularization parameter values, as well as mesh sizes and time-steps.

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A Low-Rank in Time Approach to PDE-Constrained Optimization

Stoll¹,

Breiten²

2015

SIAM J. Sci. Comput.

111

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The solution of time-dependent PDE-constrained optimization problems is a challenging task in numerical analysis and applied mathematics. All-at-once discretizations and corresponding solvers provide efficient methods to robustly solve the arising discretized equations. One of the drawbacks of this approach is the high storage demand for the vectors representing the discrete space-time cylinder. Here we introduce a low-rank in time technique that exploits the low-rank nature of the solution. The theoretical foundations for this approach originate in the numerical treatment of matrix equations and can be carried over to PDE-constrained optimization. We illustrate how three different problems can be rewritten and used within a low-rank Krylov subspace solver with appropriate preconditioning.

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All-at-once solution of time-dependent Stokes control

Stoll

Wathen

2013

Journal of Computational Physics

110

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Martin Stoll

Determination of the Bond Length and Binding Energy of the Helium Dimer by Diffraction from a Transmission Grating

Regularization-Robust Preconditioners for Time-Dependent PDE-Constrained Optimization Problems

A Low-Rank in Time Approach to PDE-Constrained Optimization

All-at-once solution of time-dependent Stokes control

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