We consider the following classical autonomous variational problem: Minimize {F(u) = \int_a^b f(u(x), u'(x))dx : u ∈ AC([a, b]), u(a) = α, u(b) = β, u([a, b]) ⊆ I} where I is a real interval, α, β ∈ I, and f : I × R → [0, +∞) is possibly neither continuous, nor coercive, nor convex; in particular f(s,·) may be not convex at 0. Assuming the solvability of the relaxed problem, we prove under mild assumptions that the above variational problem has a solution, too
AbstractWe present a new approach to the variational relaxation of functionals F:D(RN;Rm)→[0,∞[ of t...
AbstractThe relaxation problem for functionals of the form ∝Ωƒ(u, Du) dx with ƒ(s, z) not necessaril...
Relaxation problems for a functional of the type $G(u) = \int_\Omega g(x,\nabla u)dx$ are analyzed,...
We consider the following classical autonomous variational problem: Minimize {F(u) = \int_a^b f(u(x)...
none2We consider the following classical autonomous variational problem minimize F (v) =\int_a^b f (...
We consider the following classical autonomous variational problem \[ \textrm{minimize\,} \left\{F(v...
Let L : RN x RN. R be a Borelian function and consider the following problems inf {F(y) = integral(a...
Relaxation problems for a functional of the type $G(u) =int_Omega g(x,∇u) dx$ are analyzed, where $...
We consider the classical autonomous constrained variational problem of minimization of \int_a^b f(v...
We consider the following autonomous variational problem: minimize {\int_a^b f(v(x), v′(x))dx: v ∈ W...
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}, ...
We consider the problem of minimizing autonomous, simple integrals such as \min\,\left\{ \int_0^T f\...
AbstractWe present a new approach to the variational relaxation of functionals F:D(RN;Rm)→[0,∞[ of t...
AbstractThe relaxation problem for functionals of the form ∝Ωƒ(u, Du) dx with ƒ(s, z) not necessaril...
Relaxation problems for a functional of the type $G(u) = \int_\Omega g(x,\nabla u)dx$ are analyzed,...
We consider the following classical autonomous variational problem: Minimize {F(u) = \int_a^b f(u(x)...
none2We consider the following classical autonomous variational problem minimize F (v) =\int_a^b f (...
We consider the following classical autonomous variational problem \[ \textrm{minimize\,} \left\{F(v...
Let L : RN x RN. R be a Borelian function and consider the following problems inf {F(y) = integral(a...
Relaxation problems for a functional of the type $G(u) =int_Omega g(x,∇u) dx$ are analyzed, where $...
We consider the classical autonomous constrained variational problem of minimization of \int_a^b f(v...
We consider the following autonomous variational problem: minimize {\int_a^b f(v(x), v′(x))dx: v ∈ W...
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}, ...
We consider the problem of minimizing autonomous, simple integrals such as \min\,\left\{ \int_0^T f\...
AbstractWe present a new approach to the variational relaxation of functionals F:D(RN;Rm)→[0,∞[ of t...
AbstractThe relaxation problem for functionals of the form ∝Ωƒ(u, Du) dx with ƒ(s, z) not necessaril...
Relaxation problems for a functional of the type $G(u) = \int_\Omega g(x,\nabla u)dx$ are analyzed,...