Cataloged from PDF version of article.The paper studies a relaxation of the basic multidimensional variational problem, when the class of admissible functions is endowed with the Lipschitz convergence introduced by Morrey. It is shown that in this setup, the integral of a variational problem must satisfy a classical growth condition, unlike the case of uniform convergence. The relaxations constructed here imply the existence of a Lipschitz convergent minimizing sequence. Based on this observation, the paper also shows that the Lavrentiev phenomenon does not occur for a class of nonconvex problems. © 2013 Institute of Mathematics, Academy of Mathematics and Systems Science, Chinese Academy of Sciences, Chinese Mathematical Society and Spring...
The functional F(u) = integral(B) f(x, Du)dx is considered, where B is the unit ball in R-n, u varie...
We consider regularity issues for minima of non-autonomous functionals in the Calculus of Variations...
For a class of functionals having the $(p,q)$-growth, we establish an improved range of exponents $p...
AbstractWe consider functionals of the calculus of variations of the form F(u)= ∝01 f(x, u, u′) dx d...
Abstract We prove the non-occurrence of Lavrentiev gaps between Lipschitz and Sobolev functions for ...
We study local minimizers of anisotropic variational integrals of the form J[u]=\int_{\Omega...
Cataloged from PDF version of article.A relaxation of multidimensional variational problems with con...
We consider the classical functional of the Calculus of Variations of the form I(u)=∫ΩF(x,u(x),∇u...
We consider the basic problem of the Calculus of variations of minimizing an integral functional amo...
We consider the problem of minimizing ∫ a ...
AbstractWe study lower semicontinuity problems for a class of integral functionals depending on a bu...
For a bounded Lipschitz domain \Omega\subset\mathbb{R}^{n} and a function u_{0}\in W...
The paper summarizes the main core of the last results that we obtained in [8, 4, 17] on the regular...
This paper studies a scalar minimization problem with an integral functional of the gradient under a...
We consider integral functionals F(u) of the calculus of variations over the integral (0,1), where t...
The functional F(u) = integral(B) f(x, Du)dx is considered, where B is the unit ball in R-n, u varie...
We consider regularity issues for minima of non-autonomous functionals in the Calculus of Variations...
For a class of functionals having the $(p,q)$-growth, we establish an improved range of exponents $p...
AbstractWe consider functionals of the calculus of variations of the form F(u)= ∝01 f(x, u, u′) dx d...
Abstract We prove the non-occurrence of Lavrentiev gaps between Lipschitz and Sobolev functions for ...
We study local minimizers of anisotropic variational integrals of the form J[u]=\int_{\Omega...
Cataloged from PDF version of article.A relaxation of multidimensional variational problems with con...
We consider the classical functional of the Calculus of Variations of the form I(u)=∫ΩF(x,u(x),∇u...
We consider the basic problem of the Calculus of variations of minimizing an integral functional amo...
We consider the problem of minimizing ∫ a ...
AbstractWe study lower semicontinuity problems for a class of integral functionals depending on a bu...
For a bounded Lipschitz domain \Omega\subset\mathbb{R}^{n} and a function u_{0}\in W...
The paper summarizes the main core of the last results that we obtained in [8, 4, 17] on the regular...
This paper studies a scalar minimization problem with an integral functional of the gradient under a...
We consider integral functionals F(u) of the calculus of variations over the integral (0,1), where t...
The functional F(u) = integral(B) f(x, Du)dx is considered, where B is the unit ball in R-n, u varie...
We consider regularity issues for minima of non-autonomous functionals in the Calculus of Variations...
For a class of functionals having the $(p,q)$-growth, we establish an improved range of exponents $p...