We approximate from below an integrand L(t,u,v) by means of functions which enjoy Lipschitz properties with respect to u and v. Convexity on v is preserved
We consider the problem of minimizing ∫ a ...
Local Lipschitz continuity of minimizers of certain integrals of the Calculus of Variations is obtai...
Sur la régularite ́ lipschitzienne des solutions d’un problème de calcul des variations avec lagra...
We approximate from below an integrand L(t,u,v) by means of functions which enjoy Lipschitz properti...
In the scope of the research in Applied Analysis as in Partial Differential Equations, a mathematicia...
AbstractThis article studies the problem of minimizing ∫ΩF(Du)+G(x,u) over the functions u∈W1,1(Ω) t...
This article studies calculus of variations problems under a convexity constraint. The main motivati...
For Lagrange problems of the calculus of variations we prove wellposedness criteria in Tikhonov&apos...
AbstractIn this paper, we present some quantitative results concerning the approximation of the kth ...
We prove the uniqueness of the solution for a non-strictly convex problem in the Calculus of Variati...
AbstractThe Tonelli existence theorem in the calculus of variations and its subsequent modifications...
AbstractIn this work we study the structure of approximate solutions of variational problems with co...
AbstractThis paper shows that every w*-lower semicontinuous Lipschitzian convex function on the dual...
Diening L, Stroffolini B, Verde A. Lipschitz regularity for some asymptotically convex problems. ESA...
Abstract. Local Lipschitz continuity of minimizers of certain integrals of the Calculus of Variation...
We consider the problem of minimizing ∫ a ...
Local Lipschitz continuity of minimizers of certain integrals of the Calculus of Variations is obtai...
Sur la régularite ́ lipschitzienne des solutions d’un problème de calcul des variations avec lagra...
We approximate from below an integrand L(t,u,v) by means of functions which enjoy Lipschitz properti...
In the scope of the research in Applied Analysis as in Partial Differential Equations, a mathematicia...
AbstractThis article studies the problem of minimizing ∫ΩF(Du)+G(x,u) over the functions u∈W1,1(Ω) t...
This article studies calculus of variations problems under a convexity constraint. The main motivati...
For Lagrange problems of the calculus of variations we prove wellposedness criteria in Tikhonov&apos...
AbstractIn this paper, we present some quantitative results concerning the approximation of the kth ...
We prove the uniqueness of the solution for a non-strictly convex problem in the Calculus of Variati...
AbstractThe Tonelli existence theorem in the calculus of variations and its subsequent modifications...
AbstractIn this work we study the structure of approximate solutions of variational problems with co...
AbstractThis paper shows that every w*-lower semicontinuous Lipschitzian convex function on the dual...
Diening L, Stroffolini B, Verde A. Lipschitz regularity for some asymptotically convex problems. ESA...
Abstract. Local Lipschitz continuity of minimizers of certain integrals of the Calculus of Variation...
We consider the problem of minimizing ∫ a ...
Local Lipschitz continuity of minimizers of certain integrals of the Calculus of Variations is obtai...
Sur la régularite ́ lipschitzienne des solutions d’un problème de calcul des variations avec lagra...