29 pagesThis paper is devoted to the autonomous Lagrange problem of the calculus of variations with a discontinuous Lagrangian. We prove that every minimizer is Lipschitz continuous if the Lagrangian is coercive and locally bounded. The main difference with respect to the previous works in the literature is that we do not assume that the Lagrangian is convex in the velocity. We also show that, under some additional assumptions, the DuBois-Reymond necessary condition still holds in the discontinuous case. Finally, we apply these results to deduce that the value function of the Bolza problem is locally Lipschitz and satisfies (in a generalized sense) a Hamilton-Jacobi equation
We show that local minimizers of functionals of the form $\int_{\Omega} \left[f(Du(x)) + g(x\,,u(x))...
AbstractThis article studies the problem of minimizing ∫ΩF(Du)+G(x,u) over the functions u∈W1,1(Ω) t...
We consider the basic problem of the Calculus of variations of minimizing an integral functional amo...
International audienceThe paper summarizes the main core of the last results that we obtained in [8,...
International audienceWe consider a local minimizer of the classical problem of the calculus of vari...
International audienceWe consider a local minimizer, in the sense of the W1,1 norm, of a classical p...
We investigate the value function of the Bolza problem of the Calculus of Variations $$ V (t,x)=\inf...
Let L(x, xi) : R-N x R-N -> R be a Borelian function and let (P) be the problem of minimizing integr...
Sur la régularite ́ lipschitzienne des solutions d’un problème de calcul des variations avec lagra...
International audienceWe consider a nonautonomous problem of the calculus of variations where the La...
We consider the basic problem of the Calculus of variations of minimizing an integral functional amo...
AbstractA local existence theorem is proved for the basic problem in the calculus of variations, tha...
AbstractWe prove Lipschitz regularity for a minimizer of the integral ∫abL(x,x′)dt, defined on the c...
Abstract. Local Lipschitz continuity of minimizers of certain integrals of the Calculus of Variation...
Abstract. We show that local minimizers of functionals of the form∫ Ω [f(Du(x)) + g(x, u(x))] dx, u ...
We show that local minimizers of functionals of the form $\int_{\Omega} \left[f(Du(x)) + g(x\,,u(x))...
AbstractThis article studies the problem of minimizing ∫ΩF(Du)+G(x,u) over the functions u∈W1,1(Ω) t...
We consider the basic problem of the Calculus of variations of minimizing an integral functional amo...
International audienceThe paper summarizes the main core of the last results that we obtained in [8,...
International audienceWe consider a local minimizer of the classical problem of the calculus of vari...
International audienceWe consider a local minimizer, in the sense of the W1,1 norm, of a classical p...
We investigate the value function of the Bolza problem of the Calculus of Variations $$ V (t,x)=\inf...
Let L(x, xi) : R-N x R-N -> R be a Borelian function and let (P) be the problem of minimizing integr...
Sur la régularite ́ lipschitzienne des solutions d’un problème de calcul des variations avec lagra...
International audienceWe consider a nonautonomous problem of the calculus of variations where the La...
We consider the basic problem of the Calculus of variations of minimizing an integral functional amo...
AbstractA local existence theorem is proved for the basic problem in the calculus of variations, tha...
AbstractWe prove Lipschitz regularity for a minimizer of the integral ∫abL(x,x′)dt, defined on the c...
Abstract. Local Lipschitz continuity of minimizers of certain integrals of the Calculus of Variation...
Abstract. We show that local minimizers of functionals of the form∫ Ω [f(Du(x)) + g(x, u(x))] dx, u ...
We show that local minimizers of functionals of the form $\int_{\Omega} \left[f(Du(x)) + g(x\,,u(x))...
AbstractThis article studies the problem of minimizing ∫ΩF(Du)+G(x,u) over the functions u∈W1,1(Ω) t...
We consider the basic problem of the Calculus of variations of minimizing an integral functional amo...