Add to ORKGThis thesis is concerned with degenerate weakly coupled systems of Hamilton-Jacobi equations, imposed on flat torus, using both PDE and dynamical methods. The PDE approach relies essentially on control and viscosity solutions tools. Our main contribution is the construction of an algorithm through which we can get a critical solution to the system as limit of monotonic sequence of subsolutions and we also adapt the algorithm to non compact setting. Moreover, we get a characterization of isolated points of the Aubry set and establish semi-concavity type estimates for critical subsolution. A crucial step in our work is to reduce our analysis from systems into either scalar Eikonal equations or discounted ones. Whereas, in the dynamical...
International audienceWe show a large time behavior result for class of weakly coupled systems of fi...
We show a large time behavior result for class of weakly coupled systems of first-order Hamilton-Jac...
In this paper we study the stability of integrable Hamiltonian systems under small perturbations, pr...
We study a class of weakly coupled systems of Hamilton–Jacobi equations at the critical level. We as...
We introduce the notion of Aubry set for weakly coupled systems of Hamilton--Jacobi equations on the...
I present two recent research directions in this dissertation. The first direction is on the study o...
We consider a weakly coupled system of discounted Hamilton-Jacobi equations set on a closed Riemanni...
We propose a PDE approach to the Aubry-Mather theory using viscosity solutions. This allows to treat...
This expository paper explains some of the restrictions imposed by the theory of Dynamical Systems o...
In this paper, we consider the existence of viscosity solutions of weakly coupled Hamilton-Jacobi sy...
International audienceWe show a large time behavior result for class of weakly coupled systems of fi...
We consider the Hamilton–Jacobi equation ?_t u + H(x, Du) = 0 in (0, +?) × T^N , where T^N is the fl...
International audienceWe show a large time behavior result for class of weakly coupled systems of fi...
International audienceFollowing the random approach of [1], we define a Lax–Oleinik formula adapted ...
Following the random approach of , we define a Lax-Oleinik formula adapted to evolutive weakly coupl...
International audienceWe show a large time behavior result for class of weakly coupled systems of fi...
We show a large time behavior result for class of weakly coupled systems of first-order Hamilton-Jac...
In this paper we study the stability of integrable Hamiltonian systems under small perturbations, pr...
We study a class of weakly coupled systems of Hamilton–Jacobi equations at the critical level. We as...
We introduce the notion of Aubry set for weakly coupled systems of Hamilton--Jacobi equations on the...
I present two recent research directions in this dissertation. The first direction is on the study o...
We consider a weakly coupled system of discounted Hamilton-Jacobi equations set on a closed Riemanni...
We propose a PDE approach to the Aubry-Mather theory using viscosity solutions. This allows to treat...
This expository paper explains some of the restrictions imposed by the theory of Dynamical Systems o...
In this paper, we consider the existence of viscosity solutions of weakly coupled Hamilton-Jacobi sy...
International audienceWe show a large time behavior result for class of weakly coupled systems of fi...
We consider the Hamilton–Jacobi equation ?_t u + H(x, Du) = 0 in (0, +?) × T^N , where T^N is the fl...
International audienceWe show a large time behavior result for class of weakly coupled systems of fi...
International audienceFollowing the random approach of [1], we define a Lax–Oleinik formula adapted ...
Following the random approach of , we define a Lax-Oleinik formula adapted to evolutive weakly coupl...
International audienceWe show a large time behavior result for class of weakly coupled systems of fi...
We show a large time behavior result for class of weakly coupled systems of first-order Hamilton-Jac...
In this paper we study the stability of integrable Hamiltonian systems under small perturbations, pr...