For a bounded Lipschitz domain \Omega\subset\mathbb{R}^{n} and a function u_{0}\in W_{1}^{1}(\Omega;\mathbb{R}^{N}) we consider the minimization problem (\mathcal{P}) \int_{\Omega}f(\nabla u)dx\rightarrow\mbox{min in}\: u_{0}+\overset{\text{\textdegree}}{W_{1}^{1}}(\Omega;\mathbb{R}^{N}) where f:\mathbb{R}^{nN}\rightarrow[0,\infty) is a strictly convex integrand. Let \mathcal{M} denote the set of all L^{1}-cluster points of minimizing sequences of problem (\mathcal{P}) coincides with the relaxation based on the notation of the extended Lagrangian, moreover, we prove that the elements u of \mathcal{M}are in one-to-one correspondence with the s...
We describe an algorithm to approximate the minimizer of an elliptic functional in the form R Ω j(x...
Suppose that f:\mathbb{R}^{nN}\rightarrow\mathbb{R} is a strictly convex energy density ...
Consider the minimization problem $$ (*)~~~~\min\left\{\int_0^1 f(t,u'(t))dt;\ u\in W^{1,1}([0,1],...
We consider the problem of minimizing ∫ a ...
Relaxation problems for a functional of the type $G(u) = int_Omega g(x, abla u)dx$ are analyzed, wh...
We prove local Lipschitz regularity for minimizers of functionals with integrand of polynomial growt...
Local Lipschitz continuity of local minimizers of vectorial integrals ∫Ω f(x,Du)dx is proved when f ...
We consider the problem of minimizing $$ \int_{\Omega} [ L(\nabla v(x))+g(x,...
Let Omega be an open bounded subset of Rn and f a continuous function on Omega satisfying f(x) > 0 f...
Relaxation problems for a functional of the type $G(u) =int_Omega g(x,∇u) dx$ are analyzed, where $...
Cataloged from PDF version of article.The paper studies a relaxation of the basic multidimensional v...
The convergence behavior of gradient methods for minimizing convex differentiable functions is one o...
We study the minimization of convex, variational integrals of linear growth among all functions in t...
This paper studies a scalar minimization problem with an integral functional of the gradient under a...
Relaxation refers to the procedure of enlarging the domain of a variational problem or the search sp...
We describe an algorithm to approximate the minimizer of an elliptic functional in the form R Ω j(x...
Suppose that f:\mathbb{R}^{nN}\rightarrow\mathbb{R} is a strictly convex energy density ...
Consider the minimization problem $$ (*)~~~~\min\left\{\int_0^1 f(t,u'(t))dt;\ u\in W^{1,1}([0,1],...
We consider the problem of minimizing ∫ a ...
Relaxation problems for a functional of the type $G(u) = int_Omega g(x, abla u)dx$ are analyzed, wh...
We prove local Lipschitz regularity for minimizers of functionals with integrand of polynomial growt...
Local Lipschitz continuity of local minimizers of vectorial integrals ∫Ω f(x,Du)dx is proved when f ...
We consider the problem of minimizing $$ \int_{\Omega} [ L(\nabla v(x))+g(x,...
Let Omega be an open bounded subset of Rn and f a continuous function on Omega satisfying f(x) > 0 f...
Relaxation problems for a functional of the type $G(u) =int_Omega g(x,∇u) dx$ are analyzed, where $...
Cataloged from PDF version of article.The paper studies a relaxation of the basic multidimensional v...
The convergence behavior of gradient methods for minimizing convex differentiable functions is one o...
We study the minimization of convex, variational integrals of linear growth among all functions in t...
This paper studies a scalar minimization problem with an integral functional of the gradient under a...
Relaxation refers to the procedure of enlarging the domain of a variational problem or the search sp...
We describe an algorithm to approximate the minimizer of an elliptic functional in the form R Ω j(x...
Suppose that f:\mathbb{R}^{nN}\rightarrow\mathbb{R} is a strictly convex energy density ...
Consider the minimization problem $$ (*)~~~~\min\left\{\int_0^1 f(t,u'(t))dt;\ u\in W^{1,1}([0,1],...