Add to ORKGInternational audienceWe establish the uniqueness of the solutions for a degenerate scalar problem in the multiple integrals calculus of variations. The proof requires as a preliminary step the study of the regularity properties of the solutions and of their level sets. We exploit the uniqueness and the regularity results to explore some of their qualitative properties. In particular, we emphasize the link between the supports of the solutions and the Cheeger problem
We investigate uniqueness of solutions to the initial value problem for degenerate parabolic equatio...
We investigate the uniqueness of the solutions for a non-strictly convex problem in the Calculus of ...
We use the direct method of the calculus of variations to prove the existence of solutions to some d...
International audienceWe establish the uniqueness of the solutions for a degenerate scalar problem i...
We review the long-standing issue of regularity of solutions to the basic prob-lem in the calculus o...
We show that asserting the regularity (in the sense of Rund) of a first-order parametric multiple-in...
summary:Continuing the previous Part I, the degenerate first order variational integrals depending o...
Summary.- The authors prove existence theorems /or the minimum o] multiple integrals o / the calculu...
summary:The criteria of extremality for classical variational integrals depending on several functio...
In the work the uniqueness of the solution of the modified Cauchy problem was proved for a second ki...
AbstractIn the first part of this note, we introduced and proved the existence of renormalized solut...
Abstract. We consider a class of asymptotically linear variational in-equalities. We show the existe...
Abstract The uniqueness of the solution for the definite problem of a parabolic variational inequali...
We consider a class of asymptotically linear variational inequalities. We show the existence of a no...
This thesis belongs in the fields of calculus of variations, elliptic partial differential equations...
We investigate uniqueness of solutions to the initial value problem for degenerate parabolic equatio...
We investigate the uniqueness of the solutions for a non-strictly convex problem in the Calculus of ...
We use the direct method of the calculus of variations to prove the existence of solutions to some d...
International audienceWe establish the uniqueness of the solutions for a degenerate scalar problem i...
We review the long-standing issue of regularity of solutions to the basic prob-lem in the calculus o...
We show that asserting the regularity (in the sense of Rund) of a first-order parametric multiple-in...
summary:Continuing the previous Part I, the degenerate first order variational integrals depending o...
Summary.- The authors prove existence theorems /or the minimum o] multiple integrals o / the calculu...
summary:The criteria of extremality for classical variational integrals depending on several functio...
In the work the uniqueness of the solution of the modified Cauchy problem was proved for a second ki...
AbstractIn the first part of this note, we introduced and proved the existence of renormalized solut...
Abstract. We consider a class of asymptotically linear variational in-equalities. We show the existe...
Abstract The uniqueness of the solution for the definite problem of a parabolic variational inequali...
We consider a class of asymptotically linear variational inequalities. We show the existence of a no...
This thesis belongs in the fields of calculus of variations, elliptic partial differential equations...
We investigate uniqueness of solutions to the initial value problem for degenerate parabolic equatio...
We investigate the uniqueness of the solutions for a non-strictly convex problem in the Calculus of ...
We use the direct method of the calculus of variations to prove the existence of solutions to some d...