Matching and mixing: Matchability of graphs under Markovian error

Abstract

We consider the problem of graph matching for a sequence of graphs generated under a time-dependent Markov chain noise model. Our edgelighter error model, a variant of the classical lamplighter random walk, iteratively corrupts the graph G0 with edge-dependent noise, creating a sequence of noisy graph copies (Gt). Much of the graph matching literature is focused on anonymization thresholds in edge-independent noise settings, and we establish novel anonymization thresholds in this edge-dependent noise setting when matching G0 and Gt. Moreover, we also compare this anonymization threshold with the mixing properties of the Markov chain noise model. We show that when G0 is drawn from an Erdos-R\'enyi model, the graph matching anonymization threshold and the mixing time of the edgelighter walk are both of order (n2 n). We further demonstrate that for more structured model for G0 (e.g., the Stochastic Block Model), graph matching anonymization can occur in O(nα n) time for some α<2, indicating that anonymization can occur before the Markov chain noise model globally mixes. Through extensive simulations, we verify our theoretical bounds in the settings of Erdos-R\'enyi random graphs and stochastic block model random graphs, and explore our findings on real-world datasets derived from a Facebook friendship network and a European research institution email communication network.