We compare the convergence of three penalization techniques: a differentiable penalty method, an exact penalization, and a smoothed exact penalization.
We consider a system that is governed by a PDE of hyperbolic type, namely, the wave equation, and is controlled by a Dirichlet boundary control.
Abstract. We consider a system that is governed by a PDE of hyperbolic type, namely, the wave equation, and is controlled by a Dirichlet boundary control.
We consider a system that is governed by a PDE of hyperbolic type, namely, the wave equation, and is controlled by a Dirichlet boundary control.
Gugat, Martin. "Penalty Techniques for State Constrained Optimal Control Problems with the Wave Equation." SIAM Journal on Control and Optimization 48.5 (2009): ...
Gugat, Martin: Penalty Techniques for State Constrained Optimal Control Problems with the Wave Equation. In: SIAM Journal on Control and Optimization 48 ...
We present an algorithm for the solution of general inequality constrained optimization problems. The algorithm is based upon an exact penalty function that ...
[PDF] Exact penalization of terminal constraints for optimal control ...
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Feb 5, 2016 · Penalty techniques for state constrained optimal control problems with the wave equation. SIAM Journal on Control and Optimization 2009; 48 ...
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An approximation procedure for time optimal control problems for the linear wave equation is analyzed. Its asymptotic behavior is investigated and an ...
Abstract. We present a method for solving PDE constrained optimization problems based on a penalty formulation. This method aims to combine.