English

Tight Probability Bounds with Pairwise Independence

Optimization and Control 2022-11-24 v6 Combinatorics Probability

Abstract

While useful probability bounds for nn pairwise independent Bernoulli random variables adding up to at least an integer kk have been proposed in the literature, none of these bounds are tight in general. In this paper, we provide several results in this direction. Firstly, when k=1k = 1, the tightest upper bound on the probability of the union of nn pairwise independent events is provided in closed-form for any input marginal probability vector p[0,1]n\mathbf{p} \in [0,1]^n. To prove the result, we show the existence of a positively correlated Bernoulli random vector with transformed bivariate probabilities, which is of independent interest. Building on this, we show that the ratio of the Boole union bound and the tight pairwise independent bound is upper bounded by 4/34/3 and that the ratio is attained. Applications of the result in correlation gap analysis and distributionally robust bottleneck optimization are discussed. The result is extended to find the tightest lower bound on the probability of the intersection of nn pairwise independent events. Secondly, for any k2k \geq 2 and input marginal probability vector p[0,1]n\mathbf{p} \in [0,1]^n, new upper bounds are derived by exploiting ordering of probabilities. Numerical examples are provided to illustrate when the bounds provide improvement over existing bounds. Lastly, we identify specific instances when the existing and the new bounds are tight, for example, with identical marginal probabilities.

Keywords

Cite

@article{arxiv.2006.00516,
  title  = {Tight Probability Bounds with Pairwise Independence},
  author = {Arjun Ramachandra and Karthik Natarajan},
  journal= {arXiv preprint arXiv:2006.00516},
  year   = {2022}
}

Comments

42 pages, 6 figures

R2 v1 2026-06-23T15:56:31.656Z