Localization Transition of Biased Random Walks on Random Networks
Abstract
We study random walks on large random graphs that are biased towards a randomly chosen but fixed target node. We show that a critical bias strength bc exists such that most walks find the target within a finite time when b>bc. For b<bc, a finite fraction of walks drifts off to infinity before hitting the target. The phase transition at b=bc is second order, but finite size behavior is complex and does not obey the usual finite size scaling ansatz. By extending rigorous results for biased walks on Galton-Watson trees, we give the exact analytical value for bc and verify it by large scale simulations.
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