AbstractClassical one-dimensional, autonomous Lagrange problems are considered. In absence of any smoothness, convexity or coercivity condition on the energy density, we prove a DuBois-Reymond type necessary condition, expressed as a differential inclusion involving the subdifferential of convex analysis. As a consequence, a non-existence result is obtained
29 pagesThis paper is devoted to the autonomous Lagrange problem of the calculus of variations with ...
AbstractWe provide a unified approach to prove existence results for the Dirichlet problem for Hamil...
The paper summarizes the main core of the last results that we obtained in [8, 4, 17] on the regular...
none3Classical one-dimensional, autonomous Lagrange problems are considered. In absence of any smoot...
AbstractClassical one-dimensional, autonomous Lagrange problems are considered. In absence of any sm...
We consider the classical autonomous constrained variational problem of minimization of \int_a^b f(v...
none2We consider the following classical autonomous variational problem minimize F (v) =\int_a^b f (...
AbstractThis paper proves new results of existence of minimizers for the nonconvex integral ∫abL(x,x...
International audienceWe consider a local minimizer of the classical problem of the calculus of vari...
We consider the following classical autonomous variational problem \[ \textrm{minimize\,} \left\{F(v...
We consider the following autonomous variational problem: minimize {\int_a^b f(v(x), v′(x))dx: v ∈ W...
This paper studies a scalar minimization problem with an integral functional of the gradient under a...
The existence of viable solutions is proven for nonautonomous upper semicontinuous differential incl...
International audienceWe consider a local minimizer, in the sense of the W1,1 norm, of a classical p...
AbstractWe consider variational problems of the formmin∫Ω[f(Δu(x))+g(x,u(x))]dx:u∈u0+H10(Ω),wheref: ...
29 pagesThis paper is devoted to the autonomous Lagrange problem of the calculus of variations with ...
AbstractWe provide a unified approach to prove existence results for the Dirichlet problem for Hamil...
The paper summarizes the main core of the last results that we obtained in [8, 4, 17] on the regular...
none3Classical one-dimensional, autonomous Lagrange problems are considered. In absence of any smoot...
AbstractClassical one-dimensional, autonomous Lagrange problems are considered. In absence of any sm...
We consider the classical autonomous constrained variational problem of minimization of \int_a^b f(v...
none2We consider the following classical autonomous variational problem minimize F (v) =\int_a^b f (...
AbstractThis paper proves new results of existence of minimizers for the nonconvex integral ∫abL(x,x...
International audienceWe consider a local minimizer of the classical problem of the calculus of vari...
We consider the following classical autonomous variational problem \[ \textrm{minimize\,} \left\{F(v...
We consider the following autonomous variational problem: minimize {\int_a^b f(v(x), v′(x))dx: v ∈ W...
This paper studies a scalar minimization problem with an integral functional of the gradient under a...
The existence of viable solutions is proven for nonautonomous upper semicontinuous differential incl...
International audienceWe consider a local minimizer, in the sense of the W1,1 norm, of a classical p...
AbstractWe consider variational problems of the formmin∫Ω[f(Δu(x))+g(x,u(x))]dx:u∈u0+H10(Ω),wheref: ...
29 pagesThis paper is devoted to the autonomous Lagrange problem of the calculus of variations with ...
AbstractWe provide a unified approach to prove existence results for the Dirichlet problem for Hamil...
The paper summarizes the main core of the last results that we obtained in [8, 4, 17] on the regular...