English

Improved convergence theorems for bubble clusters. II. The three-dimensional case

Analysis of PDEs 2015-05-26 v1 Metric Geometry Optimization and Control

Abstract

Given a sequence {Ek}k\{\mathcal{E}_{k}\}_{k} of almost-minimizing clusters in R3\mathbb{R}^3 which converges in L1L^{1} to a limit cluster E\mathcal{E} we prove the existence of C1,αC^{1,\alpha}-diffeomorphisms fkf_k between E\partial\mathcal{E} and Ek\partial\mathcal{E}_k which converge in C1C^1 to the identity. Each of these boundaries is divided into C1,αC^{1,\alpha}-surfaces of regular points, C1,αC^{1,\alpha}-curves of points of type YY (where the boundary blows-up to three half-spaces meeting along a line at 120 degree) and isolated points of type TT (where the boundary blows up to the two-dimensional cone over a one-dimensional regular tetrahedron). The diffeomorphisms fkf_k are compatible with this decomposition, in the sense that they bring regular points into regular points and singular points of a kind into singular points of the same kind. They are almost-normal, meaning that at fixed distance from the set of singular points each fkf_k is a normal deformation of E\partial\mathcal{E}, and at fixed distance from the points of type TT, fkf_k is a normal deformation of the set of points of type YY. Finally, the tangential displacements are quantitatively controlled by the normal displacements. This improved convergence theorem is then used in the study of isoperimetric clusters in R3\mathbb{R}^3.

Keywords

Cite

@article{arxiv.1505.06709,
  title  = {Improved convergence theorems for bubble clusters. II. The three-dimensional case},
  author = {Gian Paolo Leonardi and Francesco Maggi},
  journal= {arXiv preprint arXiv:1505.06709},
  year   = {2015}
}

Comments

35 pages

R2 v1 2026-06-22T09:40:59.454Z