English

Tight Conditional Lower Bounds for Approximating Diameter in Directed Graphs

Data Structures and Algorithms 2020-11-12 v2

Abstract

Among the most fundamental graph parameters is the Diameter, the largest distance between any pair of vertices. Computing the Diameter of a graph with mm edges requires m2o(1)m^{2-o(1)} time under the Strong Exponential Time Hypothesis (SETH), which can be prohibitive for very large graphs, so efficient approximation algorithms for Diameter are desired. There is a folklore algorithm that gives a 22-approximation for Diameter in O~(m)\tilde{O}(m) time. Additionally, a line of work concludes with a 3/23/2-approximation algorithm for Diameter in weighted directed graphs that runs in O~(m3/2)\tilde{O}(m^{3/2}) time. The 3/23/2-approximation algorithm is known to be tight under SETH: Roditty and Vassilevska W. proved that under SETH any 3/2ϵ3/2-\epsilon approximation algorithm for Diameter in undirected unweighted graphs requires m2o(1)m^{2-o(1)} time, and then Backurs, Roditty, Segal, Vassilevska W., and Wein and the follow-up work of Li proved that under SETH any 5/3ϵ5/3-\epsilon approximation algorithm for Diameter in undirected unweighted graphs requires m3/2o(1)m^{3/2-o(1)} time. Whether or not the folklore 2-approximation algorithm is tight, however, is unknown, and has been explicitly posed as an open problem in numerous papers. Towards this question, Bonnet recently proved that under SETH, any 7/4ϵ7/4-\epsilon approximation requires m4/3o(1)m^{4/3-o(1)}, only for directed weighted graphs. We completely resolve this question for directed graphs by proving that the folklore 2-approximation algorithm is conditionally optimal. In doing so, we obtain a series of conditional lower bounds that together with prior work, give a complete time-accuracy trade-off that is tight with all known algorithms for directed graphs. Specifically, we prove that under SETH for any δ>0\delta>0, a (2k1kδ)(\frac{2k-1}{k}-\delta)-approximation algorithm for Diameter on directed unweighted graphs requires mkk1o(1)m^{\frac{k}{k-1}-o(1)} time.

Keywords

Cite

@article{arxiv.2011.03892,
  title  = {Tight Conditional Lower Bounds for Approximating Diameter in Directed Graphs},
  author = {Mina Dalirrooyfard and Nicole Wein},
  journal= {arXiv preprint arXiv:2011.03892},
  year   = {2020}
}

Comments

Updated to cite concurrent work

R2 v1 2026-06-23T19:59:16.196Z