Random walks on Fibonacci treelike models: emergence of power law

Abstract

In this paper, we propose a class of growth models, named Fibonacci trees F(t), with respect to the intrinsic advantage of Fibonacci sequence \Ft\. First, we turn out model F(t) to have power-law degree distribution with exponent γ greater than 3. And then, we study analytically two significant indices correlated to random walks on networks, namely, both the optimal mean first-passage time (OMFPT) and the mean first-passage time (MFPT). We obtain a closed-form expression of OMFPT using algorithm 1. Meanwhile, algorithm 2 and algorithm 3 are introduced, respectively, to capture a valid solution to MFPT. We demonstrate that our algorithms are able to be widely applied to many network models with self-similar structure to derive desired solution to OMFPT or MFPT. Especially, we capture a nontrivial result that the MFPT reported by algorithm 3 is no longer correlated linearly with the order of model F(t).