Oliver Thoma scite author profile

Oliver Thoma

4Publications

30Citation Statements Received

87Citation Statements Given

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A Priori Finite Element Error Analysis for Optimal Control of the Obstacle Problem

Meyer¹,

Thoma²

2013

SIAM J. Numer. Anal.

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An optimal control problem governed by a unilateral obstacle problem is considered. The problem is discretized using linear finite elements for the state and the obstacle and a variational discrete approach for the control. Based on strong stationarity and a quadratic growth condition we establish a priori error estimates which turn out to be quasi-optimal under additional assumptions on the data. The theoretical findings are illustrated by two numerical tests.

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Optimal Control of the Inhomogeneous Relativistic Maxwell--Newton--Lorentz Equations

Meyer¹,

Schnepp²,

Thoma³

2016

SIAM J. Control Optim.

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Abstract. This note is concerned with an optimal control problem governed by the relativistic Maxwell-Newton-Lorentz equations, which describes the motion of charges particles in electro-magnetic fields and consists of a hyperbolic PDE system coupled with a nonlinear ODE. An external magnetic field acts as control variable. Additional control constraints are incorporated by introducing a scalar magnetic potential which leads to an additional state equation in form of a very weak elliptic PDE. Existence and uniqueness for the state equation is shown and the existence of a global optimal control is established. Moreover, first-order necessary optimality conditions in form of Karush-KuhnTucker conditions are derived. A numerical test illustrates the theoretical findings.

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Optimal Control of the Inhomogeneous Relativistic Maxwell Newton Lorentz Equations

Meyer¹,

Schnepp²,

Thoma³

2014

Preprint

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Optimale Steuerung der relativistischen Maxwell-Newton-Lorentz Gleichungen

Thoma¹

2015

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Oliver Thoma

A Priori Finite Element Error Analysis for Optimal Control of the Obstacle Problem

Optimal Control of the Inhomogeneous Relativistic Maxwell--Newton--Lorentz Equations

Optimal Control of the Inhomogeneous Relativistic Maxwell Newton Lorentz Equations

Optimale Steuerung der relativistischen Maxwell-Newton-Lorentz Gleichungen

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