We consider a Bernoulli-type variational problem and we prove some geometric properties for minimizers, such as: gradient bounds, linear growth from the free boundary, density estimates, uniform convergence of level sets and the existence of plane-like minimizers in periodic media
If a variational problem comes with no boundary conditions prescribed beforehand, and yet these aris...
Abstract. The shape derivative of a functional related to a Bernoulli problem is derived without usi...
We study evolution curves of variational type, called minimizing movements, obtained via a time disc...
Consiglio Nazionale delle Ricerche - Biblioteca Centrale - P.le Aldo Moro, 7, Rome / CNR - Consiglio...
summary:We discuss variational problems on two-dimensional domains with energy densities of linear g...
We first study the minimizers, in the class of convex functions, of an elliptic functional with nonh...
This thesis deals with the one-phase Bernoulli problem, focusing on the existence and regularity of ...
Variational calculus studied methods for finding maximum and minimum values of functional. It has it...
International audienceWe study variational problems with volume constraints, i.e., with level sets o...
In this talk we consider a large class of Bernoulli-type free boundary problems with mixed periodic-...
We give a general framework under which the minimizers of a variational problem inherit the symmetry...
We give a general framework under which the minimizers of a variational problem inherit the symmetry...
We consider the functional (formula presente) in a periodic setting. We discuss whether the minimize...
Various issues are addressed related to the computation of minimizers for variational problems. Spe...
In [10], necessary and sufficient conditions in terms of variational inequalities are intro-duced to...
If a variational problem comes with no boundary conditions prescribed beforehand, and yet these aris...
Abstract. The shape derivative of a functional related to a Bernoulli problem is derived without usi...
We study evolution curves of variational type, called minimizing movements, obtained via a time disc...
Consiglio Nazionale delle Ricerche - Biblioteca Centrale - P.le Aldo Moro, 7, Rome / CNR - Consiglio...
summary:We discuss variational problems on two-dimensional domains with energy densities of linear g...
We first study the minimizers, in the class of convex functions, of an elliptic functional with nonh...
This thesis deals with the one-phase Bernoulli problem, focusing on the existence and regularity of ...
Variational calculus studied methods for finding maximum and minimum values of functional. It has it...
International audienceWe study variational problems with volume constraints, i.e., with level sets o...
In this talk we consider a large class of Bernoulli-type free boundary problems with mixed periodic-...
We give a general framework under which the minimizers of a variational problem inherit the symmetry...
We give a general framework under which the minimizers of a variational problem inherit the symmetry...
We consider the functional (formula presente) in a periodic setting. We discuss whether the minimize...
Various issues are addressed related to the computation of minimizers for variational problems. Spe...
In [10], necessary and sufficient conditions in terms of variational inequalities are intro-duced to...
If a variational problem comes with no boundary conditions prescribed beforehand, and yet these aris...
Abstract. The shape derivative of a functional related to a Bernoulli problem is derived without usi...
We study evolution curves of variational type, called minimizing movements, obtained via a time disc...
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