AbstractIn this work we prove that, if L(t,u,ξ) is a continuous function in t and u, Borel measurable in ξ, with bounded non-convex pieces in ξ, then any absolutely continuous solution u¯ to the variational problemmin{∫abL(t,u(t),u˙(t))dt:u∈W01,1(a,b)} is quasi-regular in the sense of Tonelli, i.e. u¯ is locally Lipschitz on an open set of full measure of [a,b], under the further assumption that either L is Lipschitz continuous in u, locally uniformly in ξ, but not necessarily in t, or L is invariant under a group of C1 transformations (as in the Noether's theorem). Without one of those further assumptions the solution could be not regular as shown by a recent example in Gratwick and Preiss (2010) [13]; our result is then optimal in this se...
Local Lipschitz continuity of local minimizers of vectorial integrals ∫Ω f(x,Du)dx is proved when f ...
Abstract. Local Lipschitz continuity of minimizers of certain integrals of the Calculus of Variation...
We prove the uniqueness of the solution for a non-strictly convex problem in the Calculus of Variati...
AbstractIn this work we prove that, if L(t,u,ξ) is a continuous function in t and u, Borel measurabl...
We consider a local minimizer, in the sense of the $W^{1,m}$ norm ($mge 1$), of the classical proble...
International audienceWe consider a local minimizer, in the sense of the W1,1 norm, of a classical p...
We consider the problem of minimizing ∫ a ...
AbstractThis article studies the problem of minimizing ∫ΩF(Du)+G(x,u) over the functions u∈W1,1(Ω) t...
We consider the following classical autonomous variational problem: Minimize {F(u) = \int_a^b f(u(x)...
AbstractA local existence theorem is proved for the basic problem in the calculus of variations, tha...
We prove local Lipschitz regularity for minimizers of functionals with integrand of polynomial growt...
We first study the minimizers, in the class of convex functions, of an elliptic functional with nonh...
AbstractWe consider variational problems of the formmin∫Ω[f(Δu(x))+g(x,u(x))]dx:u∈u0+H10(Ω),wheref: ...
International audienceWe consider a nonautonomous problem of the calculus of variations where the La...
Sur la régularite ́ lipschitzienne des solutions d’un problème de calcul des variations avec lagra...
Local Lipschitz continuity of local minimizers of vectorial integrals ∫Ω f(x,Du)dx is proved when f ...
Abstract. Local Lipschitz continuity of minimizers of certain integrals of the Calculus of Variation...
We prove the uniqueness of the solution for a non-strictly convex problem in the Calculus of Variati...
AbstractIn this work we prove that, if L(t,u,ξ) is a continuous function in t and u, Borel measurabl...
We consider a local minimizer, in the sense of the $W^{1,m}$ norm ($mge 1$), of the classical proble...
International audienceWe consider a local minimizer, in the sense of the W1,1 norm, of a classical p...
We consider the problem of minimizing ∫ a ...
AbstractThis article studies the problem of minimizing ∫ΩF(Du)+G(x,u) over the functions u∈W1,1(Ω) t...
We consider the following classical autonomous variational problem: Minimize {F(u) = \int_a^b f(u(x)...
AbstractA local existence theorem is proved for the basic problem in the calculus of variations, tha...
We prove local Lipschitz regularity for minimizers of functionals with integrand of polynomial growt...
We first study the minimizers, in the class of convex functions, of an elliptic functional with nonh...
AbstractWe consider variational problems of the formmin∫Ω[f(Δu(x))+g(x,u(x))]dx:u∈u0+H10(Ω),wheref: ...
International audienceWe consider a nonautonomous problem of the calculus of variations where the La...
Sur la régularite ́ lipschitzienne des solutions d’un problème de calcul des variations avec lagra...
Local Lipschitz continuity of local minimizers of vectorial integrals ∫Ω f(x,Du)dx is proved when f ...
Abstract. Local Lipschitz continuity of minimizers of certain integrals of the Calculus of Variation...
We prove the uniqueness of the solution for a non-strictly convex problem in the Calculus of Variati...