We prove a quantitative estimate on the number of certain singularities in almost minimizing clusters. In particular, we consider the singular points belonging to the lowest stratum of the Federer-Almgren stratification (namely, where each tangent cone does not split a R) with maximal density. As a consequence we obtain an estimate on the number of triple junctions in 2-dimensional clusters and on the number of tetrahedral points in 3 dimensions, that in turn implies that the boundaries of volume-constrained minimizing clusters form at most a finite number of equivalence classes modulo homeomorphism of the boundary, provided that the prescribed volumes vary in a compact set. The method is quite general and applies also to other problems: fo...
In this paper we discuss the Steiner property for minimal clusters in the plane with an anisotropic ...
Abstract We prove an isoperimetric-type bound on the $$(n-7)$$(n-7)-dimensional measu...
By using a simple topological argument, we show that the space of closed, orientable, codimension-1 ...
In this paper, we study the blow-ups of the singular points in the boundary of a minimizing cluster ...
We consider the isoperimetric problem for clusters in the plane with a double density, that is, peri...
The existence of minimizers in the fractional isoperimetric problem with multiple volume constraints...
Area minimizing surfaces and energy minimizing maps from surfaces into piecewise Euclidean pseudo 3-...
We prove that the optimal way to enclose and separate four planar regions with equal area using the ...
In this thesis we analyze the problem of the global shape of perimeter-minimizing planar N-clusters,...
In this paper we discuss the Steiner property for minimal clusters in the plane with an anisotropic ...
The topology of a minimal cluster of four planar regions with equal areas and smallest possible peri...
We prove existence of partitions of an open set Ω with a given number of phases, which minimize the ...
Given a sequence $\{\mathcal{E}_{k}\}_k$ of almost-minimizing clusters in $\mathbb{R}^3$ that conver...
We analyze the behavior of the ensemble of surface boundaries of the critical clusters at $T=T_c$ in...
The aim of this seminar is to present some results about minimal bubble clusters in some sub-Riemann...
In this paper we discuss the Steiner property for minimal clusters in the plane with an anisotropic ...
Abstract We prove an isoperimetric-type bound on the $$(n-7)$$(n-7)-dimensional measu...
By using a simple topological argument, we show that the space of closed, orientable, codimension-1 ...
In this paper, we study the blow-ups of the singular points in the boundary of a minimizing cluster ...
We consider the isoperimetric problem for clusters in the plane with a double density, that is, peri...
The existence of minimizers in the fractional isoperimetric problem with multiple volume constraints...
Area minimizing surfaces and energy minimizing maps from surfaces into piecewise Euclidean pseudo 3-...
We prove that the optimal way to enclose and separate four planar regions with equal area using the ...
In this thesis we analyze the problem of the global shape of perimeter-minimizing planar N-clusters,...
In this paper we discuss the Steiner property for minimal clusters in the plane with an anisotropic ...
The topology of a minimal cluster of four planar regions with equal areas and smallest possible peri...
We prove existence of partitions of an open set Ω with a given number of phases, which minimize the ...
Given a sequence $\{\mathcal{E}_{k}\}_k$ of almost-minimizing clusters in $\mathbb{R}^3$ that conver...
We analyze the behavior of the ensemble of surface boundaries of the critical clusters at $T=T_c$ in...
The aim of this seminar is to present some results about minimal bubble clusters in some sub-Riemann...
In this paper we discuss the Steiner property for minimal clusters in the plane with an anisotropic ...
Abstract We prove an isoperimetric-type bound on the $$(n-7)$$(n-7)-dimensional measu...
By using a simple topological argument, we show that the space of closed, orientable, codimension-1 ...