Stable Gaussian Minimal Bubbles
Abstract
It is shown that disjoint sets with fixed Gaussian volumes that partition with nearly minimum total Gaussian surface area must be close to adjacent degree sectors, when . These same results hold for any number of sets partitioning , conditional on the solution of a finite-dimensional optimization problem (similar to the endpoint case of the Plurality is Stablest Problem, or the Propeller Conjecture of Khot and Naor). When , the minimal Gaussian surface area is achieved by the cones over a regular simplex. We therefore strengthen the Milman-Neeman Gaussian multi bubble theorem to a "stability" statement. Consequently, we obtain the first known dimension-independent bounds for the Plurality is Stablest Conjecture for three candidates for a small amount of noise (and for candidates, conditional on the solution of a finite-dimensional optimization problem). In particular, we classify all stable local minima of the Gaussian surface area of sets. We focus exclusively on volume-preserving variations of the sets, avoiding the use of matrix-valued partial differential inequalities. Lastly, we remove the convexity assumption from our previous result on the minimum Gaussian surface area of a symmetric set of fixed Gaussian volume.
Cite
@article{arxiv.1901.03934,
title = {Stable Gaussian Minimal Bubbles},
author = {Steven Heilman},
journal= {arXiv preprint arXiv:1901.03934},
year = {2019}
}
Comments
48 pages, 2 figures. arXiv admin note: substantial text overlap with arXiv:1805.10203