English

Prefix Discrepancy, Smoothed Analysis, and Combinatorial Vector Balancing

Data Structures and Algorithms 2021-11-16 v1 Discrete Mathematics Combinatorics Probability

Abstract

A well-known result of Banaszczyk in discrepancy theory concerns the prefix discrepancy problem (also known as the signed series problem): given a sequence of TT unit vectors in Rd\mathbb{R}^d, find ±\pm signs for each of them such that the signed sum vector along any prefix has a small \ell_\infty-norm? This problem is central to proving upper bounds for the Steinitz problem, and the popular Koml\'os problem is a special case where one is only concerned with the final signed sum vector instead of all prefixes. Banaszczyk gave an O(logd+logT)O(\sqrt{\log d+ \log T}) bound for the prefix discrepancy problem. We investigate the tightness of Banaszczyk's bound and consider natural generalizations of prefix discrepancy: We first consider a smoothed analysis setting, where a small amount of additive noise perturbs the input vectors. We show an exponential improvement in TT compared to Banaszczyk's bound. Using a primal-dual approach and a careful chaining argument, we show that one can achieve a bound of O(logd+log ⁣logT)O(\sqrt{\log d+ \log\!\log T}) with high probability in the smoothed setting. Moreover, this smoothed analysis bound is the best possible without further improvement on Banaszczyk's bound in the worst case. We also introduce a generalization of the prefix discrepancy problem where the discrepancy constraints correspond to paths on a DAG on TT vertices. We show that an analog of Banaszczyk's O(logd+logT)O(\sqrt{\log d+ \log T}) bound continues to hold in this setting for adversarially given unit vectors and that the logT\sqrt{\log T} factor is unavoidable for DAGs. We also show that the dependence on TT cannot be improved significantly in the smoothed case for DAGs. We conclude by exploring a more general notion of vector balancing, which we call combinatorial vector balancing. We obtain near-optimal bounds in this setting, up to poly-logarithmic factors.

Keywords

Cite

@article{arxiv.2111.07049,
  title  = {Prefix Discrepancy, Smoothed Analysis, and Combinatorial Vector Balancing},
  author = {Nikhil Bansal and Haotian Jiang and Raghu Meka and Sahil Singla and Makrand Sinha},
  journal= {arXiv preprint arXiv:2111.07049},
  year   = {2021}
}

Comments

22 pages. Appear in ITCS 2022

R2 v1 2026-06-24T07:37:06.163Z