Random zero sets with local growth guarantees

Abstract

We prove that if (M,d) is an n-point metric space that embeds quasisymmetrically into a Hilbert space, then for every τ>0 there is a random subset Z of M such that for any pair of points x,y∈ M with d(x,y) τ, the probability that both x∈ Z and d(y,Z) βτ/1+ (|B(y, β τ)|/|B(y,β τ)|) is (1), where >1 is a universal constant and β>0 depends only on the modulus of the quasisymmetric embedding. The proof relies on a refinement of the Arora--Rao--Vazirani rounding technique. Among the applications of this result is that the largest possible Euclidean distortion of an n-point subset of 1 is ( n), and the integrality gap of the Goemans--Linial semidefinite program for the Sparsest Cut problem on inputs of size n is ( n). Multiple further applications are given.

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