Improved convergence theorems for bubble clusters. II. The three-dimensional case
Abstract
Given a sequence of almost-minimizing clusters in which converges in to a limit cluster we prove the existence of -diffeomorphisms between and which converge in to the identity. Each of these boundaries is divided into -surfaces of regular points, -curves of points of type (where the boundary blows-up to three half-spaces meeting along a line at 120 degree) and isolated points of type (where the boundary blows up to the two-dimensional cone over a one-dimensional regular tetrahedron). The diffeomorphisms 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 is a normal deformation of , and at fixed distance from the points of type , is a normal deformation of the set of points of type . 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 .
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