English

Large signed subset sums

Metric Geometry 2022-06-23 v4 Combinatorics

Abstract

We study the following question: for given d2d\geq 2, ndn\geq d and knk \leq n, what is the largest value c(d,n,k)c(d,n,k) such that from any set of nn unit vectors in Rd\mathbb{R}^d, we may select kk vectors with corresponding signs ±1\pm 1 so that their signed sum has norm at least c(d,n,k)c(d,n,k)? The problem is dual to classical vector sum minimization and balancing questions, which have been studied for over a century. We give asymptotically sharp estimates for c(d,n,k)c(d,n,k) in the general case. In several special cases, we provide stronger estimates: the quantity c(d,n,n)c(d,n,n) corresponds to the p\ell_p-polarization problem, while determining c(d,n,2)c(d, n, 2) is equivalent to estimating the coherence of a vector system, which is a special case of pp-frame energies. Two new proofs are presented for the classical Welch bound when n=d+1n = d+1. For large values of nn, volumetric estimates are applied for obtaining fine estimates on c(d,n,2)c(d,n,2). Studying the planar case, sharp bounds on c(2,n,k)c(2, n, k) are given. Finally, we determine the exact value of c(d,d+1,d+1)c(d,d+1,d+1) under some extra assumptions.

Keywords

Cite

@article{arxiv.2012.13164,
  title  = {Large signed subset sums},
  author = {Gergely Ambrus and Bernardo González Merino},
  journal= {arXiv preprint arXiv:2012.13164},
  year   = {2022}
}

Comments

15 pages. Updated from the printed version: planar bounds are slightly corrected, and reference to sharp bound on c(2,n,n) is added

R2 v1 2026-06-23T21:21:54.129Z