We consider the following classical autonomous variational problem: minimize {F(v)=\int_a^b f(v(x),v′(x)) dx : v ∈ AC([a,b]), v(a) = α, v(b) = β}, where the Lagrangian f is possibly neither continuous, nor convex, nor coercive. We prove a monotonicity property of the minimizers stating that they satisfy the maximum principle or the minimum one. By virtue of such a property, applying recent results concerning constrained variational problems, we derive a relaxation theorem, the DuBois-Reymond necessary condition and some existence or non-existence criteria
We consider the problem of minimizing ∫ a ...
AbstractClassical one-dimensional, autonomous Lagrange problems are considered. In absence of any sm...
We consider the problem of minimizing $$ \int_{\Omega} [ L(\nabla v(x))+g(x,...
We consider the following classical autonomous variational problem: minimize {F(v)=\int_a^b f(v(x),...
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...
We consider the classical autonomous constrained variational problem of minimization of \int_a^b f(v...
We consider the following classical autonomous variational problem: Minimize {F(u) = \int_a^b f(u(x)...
We consider the functional F(v) = \int_a^b f(t,v′(t))dt in Hp = {v ∈ W^{1,p} : v(a) = 0, v(b) = d}, ...
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...
In this paper we study the optimal control of a class of nonlinear finite-dimensional optimal contro...
We consider the problem of minimizing ∫ a ...
AbstractClassical one-dimensional, autonomous Lagrange problems are considered. In absence of any sm...
We consider the problem of minimizing $$ \int_{\Omega} [ L(\nabla v(x))+g(x,...
We consider the following classical autonomous variational problem: minimize {F(v)=\int_a^b f(v(x),...
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...
We consider the classical autonomous constrained variational problem of minimization of \int_a^b f(v...
We consider the following classical autonomous variational problem: Minimize {F(u) = \int_a^b f(u(x)...
We consider the functional F(v) = \int_a^b f(t,v′(t))dt in Hp = {v ∈ W^{1,p} : v(a) = 0, v(b) = d}, ...
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...
In this paper we study the optimal control of a class of nonlinear finite-dimensional optimal contro...
We consider the problem of minimizing ∫ a ...
AbstractClassical one-dimensional, autonomous Lagrange problems are considered. In absence of any sm...
We consider the problem of minimizing $$ \int_{\Omega} [ L(\nabla v(x))+g(x,...