Network Landscape from a Brownian Particle's Perspective

Abstract

Given a complex biological or social network, how many clusters should it be decomposed into? We define the distance di,j from node i to node j as the average number of steps a Brownian particle takes to reach j from i. Node j is a global attractor of i if di,j≤ di,k for any k of the graph; it is a local attractor of i, if j∈ Ei (the set of nearest-neighbors of i) and di,j≤ di,l for any l∈ Ei. Based on the intuition that each node should have a high probability to be in the same community as its global (local) attractor on the global (local) scale, we present a simple method to uncover a network's community structure. This method is applied to several real networks and some discussion on its possible extensions is made.

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