English

A Tighter Approximation Guarantee for Greedy Minimum Entropy Coupling

Information Theory 2022-03-11 v1 Data Structures and Algorithms math.IT

Abstract

We examine the minimum entropy coupling problem, where one must find the minimum entropy variable that has a given set of distributions S={p1,,pm}S = \{p_1, \dots, p_m \} as its marginals. Although this problem is NP-Hard, previous works have proposed algorithms with varying approximation guarantees. In this paper, we show that the greedy coupling algorithm of [Kocaoglu et al., AAAI'17] is always within log2(e)\log_2(e) (1.44\approx 1.44) bits of the minimum entropy coupling. In doing so, we show that the entropy of the greedy coupling is upper-bounded by H(S)+log2(e)H\left(\bigwedge S \right) + \log_2(e). This improves the previously best known approximation guarantee of 22 bits within the optimal [Li, IEEE Trans. Inf. Theory '21]. Moreover, we show our analysis is tight by proving there is no algorithm whose entropy is upper-bounded by H(S)+cH\left(\bigwedge S \right) + c for any constant c<log2(e)c<\log_2(e). Additionally, we examine a special class of instances where the greedy coupling algorithm is exactly optimal.

Keywords

Cite

@article{arxiv.2203.05108,
  title  = {A Tighter Approximation Guarantee for Greedy Minimum Entropy Coupling},
  author = {Spencer Compton},
  journal= {arXiv preprint arXiv:2203.05108},
  year   = {2022}
}
R2 v1 2026-06-24T10:08:06.743Z