We consider the problem of flux identification for 1-d scalar conservation laws formulating it as an optimal control problem. We introduce a new optimization strategy to compute numerical approximations of minimizing fluxes. We first prove the existence of minimizers. We also prove the convergence of discrete minima obtained by means of monotone numerical approximation schemes, by a Γ-convergence argument. Then we address the problem of developing efficient descent algorithms. We first consider and compare the existing two possible approaches. The first one, the so-called discrete approach, based on a direct computation of gradients in the discrete problem and the so-called continuous one, where the discrete descent direction is obtained as...
We analyze the convergence of discretization schemes for the adjoint equation arising in the adjoint...
We prove that a class of monotone finite volume schemes for scalar conservation laws with discontinu...
In the context of road traffic modeling we consider a scalar hyperbolic conservation law with the fl...
We consider the problem of flux identification for 1-d scalar conservation laws formulating it as an...
We analyze a model optimal control problem for a 2D scalar conservation law-the so-called inverse de...
We introduce a new optimization strategy to compute numerical approximations of minimizers for optim...
In this article we study, by the vanishing viscosity method, the sensitivity analysis of an optimal ...
Ce papier présente une théorie pour le contrôle optimal des lois de conservation scalaires en une di...
This notes contain a short introduction to the the study of nu-merical approximation of control prob...
We analyze 1 - d forced steady state scalar conservation laws. We first show the existence and uniqu...
In this thesis we deal with two control problems for a scalar conservation law with spatial discont...
In this paper we present a new reduced basis technique for parametrized nonlinear scalar conservatio...
12In this paper we derive a method to obtain a solution of an optimal control problem for a scalar c...
For scalar conservation laws in one space dimension with a flux function discontinuous in space, the...
For scalar conservation laws in one space dimension with a flux function discontinuous in ...
We analyze the convergence of discretization schemes for the adjoint equation arising in the adjoint...
We prove that a class of monotone finite volume schemes for scalar conservation laws with discontinu...
In the context of road traffic modeling we consider a scalar hyperbolic conservation law with the fl...
We consider the problem of flux identification for 1-d scalar conservation laws formulating it as an...
We analyze a model optimal control problem for a 2D scalar conservation law-the so-called inverse de...
We introduce a new optimization strategy to compute numerical approximations of minimizers for optim...
In this article we study, by the vanishing viscosity method, the sensitivity analysis of an optimal ...
Ce papier présente une théorie pour le contrôle optimal des lois de conservation scalaires en une di...
This notes contain a short introduction to the the study of nu-merical approximation of control prob...
We analyze 1 - d forced steady state scalar conservation laws. We first show the existence and uniqu...
In this thesis we deal with two control problems for a scalar conservation law with spatial discont...
In this paper we present a new reduced basis technique for parametrized nonlinear scalar conservatio...
12In this paper we derive a method to obtain a solution of an optimal control problem for a scalar c...
For scalar conservation laws in one space dimension with a flux function discontinuous in space, the...
For scalar conservation laws in one space dimension with a flux function discontinuous in ...
We analyze the convergence of discretization schemes for the adjoint equation arising in the adjoint...
We prove that a class of monotone finite volume schemes for scalar conservation laws with discontinu...
In the context of road traffic modeling we consider a scalar hyperbolic conservation law with the fl...