English

k-Connectivity of Random Key Graphs

Physics and Society 2015-02-03 v1 Discrete Mathematics Social and Information Networks Combinatorics Probability

Abstract

Random key graphs represent topologies of secure wireless sensor networks that apply the seminal Eschenauer-Gligor random key predistribution scheme to secure communication between sensors. These graphs have received much attention and also been used in diverse application areas beyond secure sensor networks; e.g., cryptanalysis, social networks, and recommender systems. Formally, a random key graph with nn nodes is constructed by assigning each node XnX_n keys selected uniformly at random from a pool of YnY_n keys and then putting an undirected edge between any two nodes sharing at least one key. Considerable progress has been made in the literature to analyze connectivity and kk-connectivity of random key graphs, where kk-connectivity of a graph ensures connectivity even after the removal of kk nodes or kk edges. Yet, it still remains an open question for kk-connectivity in random key graphs under Xn2X_n \geq 2 and Xn=o(lnn)X_n = o(\sqrt{\ln n}) (the case of Xn=1X_n=1 is trivial). In this paper, we answer the above problem by providing an exact analysis of kk-connectivity in random key graphs under Xn2X_n \geq 2.

Keywords

Cite

@article{arxiv.1502.00400,
  title  = {k-Connectivity of Random Key Graphs},
  author = {Jun Zhao and Osman Yağan and Virgil Gligor},
  journal= {arXiv preprint arXiv:1502.00400},
  year   = {2015}
}
R2 v1 2026-06-22T08:18:42.909Z