We consider the isoperimetric problem for clusters in the plane with a double density, that is, perimeter and volume depend on two weights. In this paper, we consider the isotropic case, in the parallel paper [V. Franceschi, A. Pratelli and G. Stefani, On the Steiner property for planar minimizing clusters. The anisotropic case, preprint (2020)] the anisotropic case is studied. Here we prove that, in a wide generality, minimal clusters enjoy the "Steiner property", which means that the boundaries are made by C-1,C-gamma regular arcs, meeting in finitely many triple points with the 120 degrees property.
On the Steiner property for planar minimizing clusters. The isotropic case
Franceschi V.;
2023
Abstract
We consider the isoperimetric problem for clusters in the plane with a double density, that is, perimeter and volume depend on two weights. In this paper, we consider the isotropic case, in the parallel paper [V. Franceschi, A. Pratelli and G. Stefani, On the Steiner property for planar minimizing clusters. The anisotropic case, preprint (2020)] the anisotropic case is studied. Here we prove that, in a wide generality, minimal clusters enjoy the "Steiner property", which means that the boundaries are made by C-1,C-gamma regular arcs, meeting in finitely many triple points with the 120 degrees property.File in questo prodotto:
| File | Dimensione | Formato | |
|---|---|---|---|
|
22-FPS-isotropic.pdf
non disponibili
Descrizione: file
Tipologia:
Published (publisher's version)
Licenza:
Accesso privato - non pubblico
Dimensione
427.51 kB
Formato
Adobe PDF
|
427.51 kB | Adobe PDF | Visualizza/Apri Richiedi una copia |
Pubblicazioni consigliate
I documenti in IRIS sono protetti da copyright e tutti i diritti sono riservati, salvo diversa indicazione.
