Random Walks on Small World Networks

Abstract

We study the mixing time of random walks on small-world networks modelled as follows: starting with the 2-dimensional periodic grid, each pair of vertices \u,v\ with distance d>1 is added as a "long-range" edge with probability proportional to d-r, where r≥ 0 is a parameter of the model. Kleinberg studied a close variant of this network model and proved that the (decentralised) routing time is O(( n)2) when r=2 and n(1) when r≠ 2. Here, we prove that the random walk also undergoes a phase transition at r=2, but in this case the phase transition is of a different form. We establish that the mixing time is ( n) for r<2, O(( n)4) for r=2 and n(1) for r>2.