In this paper we set up a rigorous justification for the reinitialization algorithm. Using the theory of viscosity solutions, we propose a well-posed Hamilton-Jacobi equation with a parameter, which is derived from homogenization for a Hamiltonian discontinuous in time which appears in the reinitialization. We prove that, as the parameter tends to infinity, the solution of the initial value problem converges to a signed distance function to the evolving interfaces. A locally uniform convergence is shown when the distance function is continuous, whereas a weaker notion of convergence is introduced to establish a convergence result to a possibly discontinuous distance function. In terms of the geometry of the interfaces, we give a necessary a...
In the past few years, the level set method has been extensively used for the numerical solution of ...
In this article, we first introduce aLax-Friedrichs type finite difference method to compute the $\m...
This third version is a major release of our book project on Hamilton-Jacobi Equations and Control P...
We introduce two types of finite difference methods to compute the Lsolution [14] and the proper vi...
A new notion of solution (called £-solution) is introduced so that the Cauchy problem for the Hamilt...
We consider Hamilton--Jacobi equations, where the Hamiltonian depends discontinuously on both the...
We consider Hamilton--Jacobi equations, where the Hamiltonian depends discontinuously on both the sp...
International audienceA new method is developed to approximate a first-order Hamilton-Jacobi equatio...
We study the Cauchy problem for the simplest first-order Hamilton-Jacobi equation in one space dimen...
In the classical level set method, the slope of solutions can be very small or large, and it can mak...
We study the initial-value problem for a Hamilton-Jacobi equation whose Hamiltonian is dis- continuo...
We provide a general result concerning the homogenization of nonconvex viscous Hamilton-Jacobi equat...
We study dislocation dynamics with a level set point of view. The model we present here looks at the...
We consider the stationary Hamilton-Jacobi equation bij(x)uxiuxj = [f(x)] 2 where b can vanish at so...
International audienceWe consider the stationary Hamilton-Jacobi equation where the dynamics can van...
In the past few years, the level set method has been extensively used for the numerical solution of ...
In this article, we first introduce aLax-Friedrichs type finite difference method to compute the $\m...
This third version is a major release of our book project on Hamilton-Jacobi Equations and Control P...
We introduce two types of finite difference methods to compute the Lsolution [14] and the proper vi...
A new notion of solution (called £-solution) is introduced so that the Cauchy problem for the Hamilt...
We consider Hamilton--Jacobi equations, where the Hamiltonian depends discontinuously on both the...
We consider Hamilton--Jacobi equations, where the Hamiltonian depends discontinuously on both the sp...
International audienceA new method is developed to approximate a first-order Hamilton-Jacobi equatio...
We study the Cauchy problem for the simplest first-order Hamilton-Jacobi equation in one space dimen...
In the classical level set method, the slope of solutions can be very small or large, and it can mak...
We study the initial-value problem for a Hamilton-Jacobi equation whose Hamiltonian is dis- continuo...
We provide a general result concerning the homogenization of nonconvex viscous Hamilton-Jacobi equat...
We study dislocation dynamics with a level set point of view. The model we present here looks at the...
We consider the stationary Hamilton-Jacobi equation bij(x)uxiuxj = [f(x)] 2 where b can vanish at so...
International audienceWe consider the stationary Hamilton-Jacobi equation where the dynamics can van...
In the past few years, the level set method has been extensively used for the numerical solution of ...
In this article, we first introduce aLax-Friedrichs type finite difference method to compute the $\m...
This third version is a major release of our book project on Hamilton-Jacobi Equations and Control P...