Multifractality in random networks with power-law decaying bond strengths

Abstract

In this paper we demonstrate numerically that random networks whose adjacency matrices A are represented by a diluted version of the Power--Law Banded Random Matrix (PBRM) model have multifractal eigenfunctions. The PBRM model describes one--dimensional samples with random long--range bonds. The bond strengths of the model, which decay as a power--law, are tuned by the parameter μ as Amn |m-n|-μ; while the sparsity is driven by the average network connectivity α: for α=0 the vertices in the network are isolated and for α=1 the network is fully connected and the PBRM model is recovered. Though it is known that the PBRM model has multifractal eigenfunctions at the critical value μ=μc=1, we clearly show [from the scaling of the relative fluctuation of the participation number I2 as well as the scaling of the probability distribution functions P( I2)] the existence of the critical value μc μc(α) for α<1. Moreover, we characterise the multifractality of the eigenfunctions of our random network model by the use of the corresponding multifractal dimensions Dq, that we compute from the finite network-size scaling of the typical eigenfunction participation numbers Iq .