We introduce a new optimization strategy to compute numerical approximations of minimizers for optimal control problems governed by scalar conservation laws in the presence of shocks. We focus on the 1 − d inviscid Burgers equation. We first prove the existence of minimizers and, by a -convergence argument, the convergence of discrete minima obtained by means of numerical approximation schemes satisfying the so called onesided Lipschitz condition (OSLC). Then we address the problem of developing efficient descent algorithms. We first consider and compare the existing two possible approaches: the so-called discrete approach, based on a direct computation of gradients in the discrete problem and the so-called continuous one, where the discret...
This work is devoted to solve scalar hyperbolic conservation laws in the presence of strong shocks w...
International audienceIn this paper, we study the exponential stabilization of a shock steady state ...
The final publication is available at Springer via https://doi.org/10.1007/978-3-319-49262-9_7Invers...
In this paper, we discuss the efficiency of various numerical methods for the inverse design of the ...
We consider the problem of flux identification for 1-d scalar conservation laws formulating it as an...
Ce papier présente une théorie pour le contrôle optimal des lois de conservation scalaires en une di...
In this paper, we discuss the efficiency of various numerical methods for the inverse desi...
We analyze a model optimal control problem for a 2D scalar conservation law-the so-called inverse de...
Optimal control of PDEs has a crucial place in many parts of sciences and industry. Over the last de...
In this paper, we study the problem of inverse design for the one-dimensional Burgers equation. This...
tion laws Abstract. This work is devoted to solve scalar hyperbolic conservation laws in the pres-en...
In this article we study, by the vanishing viscosity method, the sensitivity analysis of an optimal ...
This notes contain a short introduction to the the study of nu-merical approximation of control prob...
In the context of adjoint-based optimization, nonlinear conservation laws pose significant problems ...
AbstractThe optimal control of unsteady Burgers equation without constraints and with control constr...
This work is devoted to solve scalar hyperbolic conservation laws in the presence of strong shocks w...
International audienceIn this paper, we study the exponential stabilization of a shock steady state ...
The final publication is available at Springer via https://doi.org/10.1007/978-3-319-49262-9_7Invers...
In this paper, we discuss the efficiency of various numerical methods for the inverse design of the ...
We consider the problem of flux identification for 1-d scalar conservation laws formulating it as an...
Ce papier présente une théorie pour le contrôle optimal des lois de conservation scalaires en une di...
In this paper, we discuss the efficiency of various numerical methods for the inverse desi...
We analyze a model optimal control problem for a 2D scalar conservation law-the so-called inverse de...
Optimal control of PDEs has a crucial place in many parts of sciences and industry. Over the last de...
In this paper, we study the problem of inverse design for the one-dimensional Burgers equation. This...
tion laws Abstract. This work is devoted to solve scalar hyperbolic conservation laws in the pres-en...
In this article we study, by the vanishing viscosity method, the sensitivity analysis of an optimal ...
This notes contain a short introduction to the the study of nu-merical approximation of control prob...
In the context of adjoint-based optimization, nonlinear conservation laws pose significant problems ...
AbstractThe optimal control of unsteady Burgers equation without constraints and with control constr...
This work is devoted to solve scalar hyperbolic conservation laws in the presence of strong shocks w...
International audienceIn this paper, we study the exponential stabilization of a shock steady state ...
The final publication is available at Springer via https://doi.org/10.1007/978-3-319-49262-9_7Invers...