English

A Sample-Based Algorithm for Approximately Testing $r$-Robustness of a Digraph

Systems and Control 2022-07-26 v1 Social and Information Networks Systems and Control

Abstract

One of the intensely studied concepts of network robustness is rr-robustness, which is a network topology property quantified by an integer rr. It is required by mean subsequence reduced (MSR) algorithms and their variants to achieve resilient consensus. However, determining rr-robustness is intractable for large networks. In this paper, we propose a sample-based algorithm to approximately test rr-robustness of a digraph with nn vertices and mm edges. For a digraph with a moderate assumption on the minimum in-degree, and an error parameter 0<ϵ10<\epsilon\leq 1, the proposed algorithm distinguishes (r+ϵn)(r+\epsilon n)-robust graphs from graphs which are not rr-robust with probability (1δ)(1-\delta). Our algorithm runs in exp(O((ln1ϵδ)/ϵ2))m\exp(O((\ln{\frac{1}{\epsilon\delta}})/\epsilon^2))\cdot m time. The running time is linear in the number of edges if ϵ\epsilon is a constant.

Keywords

Cite

@article{arxiv.2207.12110,
  title  = {A Sample-Based Algorithm for Approximately Testing $r$-Robustness of a Digraph},
  author = {Yuhao Yi and Yuan Wang and Xingkang He and Stacy Patterson and Karl H. Johansson},
  journal= {arXiv preprint arXiv:2207.12110},
  year   = {2022}
}

Comments

8 pages, 3 figures

R2 v1 2026-06-25T01:12:01.178Z