We study existence of minimizers for non convex integral functionals. Applying some new results on differential inclusions, we get sufficient conditions. We also study necessary conditions. We then consider some examples
Local Lipschitz continuity of minimizers of certain integrals of the Calculus of Variations is obtai...
We study integrals of the form integral(Omega) f (d omega), where 1 R is continuous and omega is a ...
Abstract. Local Lipschitz continuity of minimizers of certain integrals of the Calculus of Variation...
We study existence of minimizers for non convex integral functionals. Applying some new results on d...
We prove existence of minimizers for a class of non-convex and non-coercive integral functional
In this paper we prove new results on existence of minimizers for nonconvex problems of the calculus...
We prove existence and partial regularity of minimizers of certain functionals in the calculus of va...
We study integrals of the form integral(Omega) f(d omega(1), ..., d omega(m)), where m >= 1 is a giv...
We prove the existence of minimizers of non convex, autonomous, multiple integrals under mild assump...
International audienceWe consider a local minimizer of the classical problem of the calculus of vari...
This thesis is mainly concerned with problems in the areas of the Calculus of Variations and Partia...
1. Introduction and statements of the main results In this paper we will consider integrals of the c...
We consider non quasiconvex functional of the form (Equation Presented) defined on Sobolev functions...
The aim of this paper is to give an existence result for a class of one dimensional, non--convex, n...
We consider almost minimizers of variational integrals whose integrands are quasiconvex. Under suita...
Local Lipschitz continuity of minimizers of certain integrals of the Calculus of Variations is obtai...
We study integrals of the form integral(Omega) f (d omega), where 1 R is continuous and omega is a ...
Abstract. Local Lipschitz continuity of minimizers of certain integrals of the Calculus of Variation...
We study existence of minimizers for non convex integral functionals. Applying some new results on d...
We prove existence of minimizers for a class of non-convex and non-coercive integral functional
In this paper we prove new results on existence of minimizers for nonconvex problems of the calculus...
We prove existence and partial regularity of minimizers of certain functionals in the calculus of va...
We study integrals of the form integral(Omega) f(d omega(1), ..., d omega(m)), where m >= 1 is a giv...
We prove the existence of minimizers of non convex, autonomous, multiple integrals under mild assump...
International audienceWe consider a local minimizer of the classical problem of the calculus of vari...
This thesis is mainly concerned with problems in the areas of the Calculus of Variations and Partia...
1. Introduction and statements of the main results In this paper we will consider integrals of the c...
We consider non quasiconvex functional of the form (Equation Presented) defined on Sobolev functions...
The aim of this paper is to give an existence result for a class of one dimensional, non--convex, n...
We consider almost minimizers of variational integrals whose integrands are quasiconvex. Under suita...
Local Lipschitz continuity of minimizers of certain integrals of the Calculus of Variations is obtai...
We study integrals of the form integral(Omega) f (d omega), where 1 R is continuous and omega is a ...
Abstract. Local Lipschitz continuity of minimizers of certain integrals of the Calculus of Variation...