We prove existence of partitions of an open set Ω with a given number of phases, which minimize the sum of the fractional perimeters of all the phases, with Dirichlet boundary conditions. In two dimensions we show that, if the fractional parameter s is sufficiently close to 1, the only singular minimal cone, that is, the only minimal partition invariant by dilations and with a singular point, is given by three half-lines meeting at 120 degrees. In the case of a weighted sum of fractional perimeters, we show that there exists a unique minimal cone with three phases
Nonlocal minimal surfaces are introduced in [1] as boundary of sets that minimize the fractional per...
We consider isotropic non lower semicontinuous weighted perimeter functionals defined on partitions ...
We prove a quantitative estimate on the number of certain singularities in almost minimizing cluster...
We prove existence of partitions of an open set Ω with a given number of phases, which minimize the ...
We study the localization of sets with constant nonlocal mean curvature and prescribed small volume...
We consider a minimization problem that combines the Dirichlet energy with the nonlocal perimeter of...
This article is divided into two parts. In the first part we show that a set E has locally finite s-...
This work aims to present a study of the principal results about the fractional perimeter and the re...
This doctoral thesis is devoted to the analysis of some minimization problems that involve nonlocal ...
The topology of a minimal cluster of four planar regions with equal areas and smallest possible peri...
The thesis is on several minimization problems involving nonlocal perimeters. The nonlocal perimete...
We characterize the volume-constrained minimizers of a nonlocal free energy given by the difference ...
We prove that half spaces are the only stable nonlocal s-minimal cones in R3, for s¿(0,1) sufficient...
We consider volume-constrained minimizers of the fractional perimeter with the addition of a potenti...
We introduce an intrinsic notion of perimeter for subsets of a general Minkowski space (i:e: a finit...
Nonlocal minimal surfaces are introduced in [1] as boundary of sets that minimize the fractional per...
We consider isotropic non lower semicontinuous weighted perimeter functionals defined on partitions ...
We prove a quantitative estimate on the number of certain singularities in almost minimizing cluster...
We prove existence of partitions of an open set Ω with a given number of phases, which minimize the ...
We study the localization of sets with constant nonlocal mean curvature and prescribed small volume...
We consider a minimization problem that combines the Dirichlet energy with the nonlocal perimeter of...
This article is divided into two parts. In the first part we show that a set E has locally finite s-...
This work aims to present a study of the principal results about the fractional perimeter and the re...
This doctoral thesis is devoted to the analysis of some minimization problems that involve nonlocal ...
The topology of a minimal cluster of four planar regions with equal areas and smallest possible peri...
The thesis is on several minimization problems involving nonlocal perimeters. The nonlocal perimete...
We characterize the volume-constrained minimizers of a nonlocal free energy given by the difference ...
We prove that half spaces are the only stable nonlocal s-minimal cones in R3, for s¿(0,1) sufficient...
We consider volume-constrained minimizers of the fractional perimeter with the addition of a potenti...
We introduce an intrinsic notion of perimeter for subsets of a general Minkowski space (i:e: a finit...
Nonlocal minimal surfaces are introduced in [1] as boundary of sets that minimize the fractional per...
We consider isotropic non lower semicontinuous weighted perimeter functionals defined on partitions ...
We prove a quantitative estimate on the number of certain singularities in almost minimizing cluster...