Add to ORKGWe consider a nonconvex variational problem for which the set of admis-sible functions consists of all Lipschitz functions located between two fixed obstacles. It turns out that the value of the minimization problem at hand is equal to zero when the obstacles do not touch each other; other-wise, it might be positive. The results are obtained through the construc-tion of suitable minimizing sequences. Interpolating these minimizing sequences in some discrete space, a numerical analysis is then carried out. 1
In this paper we prove the the local Lipschitz continuity for solutions to a class of obstacle probl...
We study the minimization of convex, variational integrals of linear growth among all functions in t...
tal, Shcherbak and other authors. This is the problem of investigating Lagrangian varieties naturall...
We consider a nonconvex variational problem for which the set of admissible functions consists of al...
In this note, we consider a nonconvex variational problem for which the admissible deformations are ...
. We give a relatively complete analysis for the regularization method, which is usually used in sol...
AbstractThe free boundary value problem in obstacle problem for von Kármán equations is studied. By ...
In this work we consider the numerical resolution of the bilateral obstacle optimal control problem ...
We develop the complete free boundary analysis for solutions to classical obstacle problems related ...
We prove that solutions of some minimum problems with obstacles that may be on \Omega, thin, or on t...
In this paper we examine the problem of finding a Lipschitz function on an open domain with prescrib...
We prove Lipschitz continuity results for solutions to a class of obstacle problems under standard g...
AbstractWe consider the optimization problem min{F(g):g∈X(Ω)}, whereF(g) is a variational energy ass...
The aim of the paper is to show that the solutions to variational problems with non-standard growth ...
We prove the existence of minimizers of non convex, autonomous, multiple integrals under mild assump...
In this paper we prove the the local Lipschitz continuity for solutions to a class of obstacle probl...
We study the minimization of convex, variational integrals of linear growth among all functions in t...
tal, Shcherbak and other authors. This is the problem of investigating Lagrangian varieties naturall...
We consider a nonconvex variational problem for which the set of admissible functions consists of al...
In this note, we consider a nonconvex variational problem for which the admissible deformations are ...
. We give a relatively complete analysis for the regularization method, which is usually used in sol...
AbstractThe free boundary value problem in obstacle problem for von Kármán equations is studied. By ...
In this work we consider the numerical resolution of the bilateral obstacle optimal control problem ...
We develop the complete free boundary analysis for solutions to classical obstacle problems related ...
We prove that solutions of some minimum problems with obstacles that may be on \Omega, thin, or on t...
In this paper we examine the problem of finding a Lipschitz function on an open domain with prescrib...
We prove Lipschitz continuity results for solutions to a class of obstacle problems under standard g...
AbstractWe consider the optimization problem min{F(g):g∈X(Ω)}, whereF(g) is a variational energy ass...
The aim of the paper is to show that the solutions to variational problems with non-standard growth ...
We prove the existence of minimizers of non convex, autonomous, multiple integrals under mild assump...
In this paper we prove the the local Lipschitz continuity for solutions to a class of obstacle probl...
We study the minimization of convex, variational integrals of linear growth among all functions in t...
tal, Shcherbak and other authors. This is the problem of investigating Lagrangian varieties naturall...