Diluted banded random matrices: Scaling behavior of eigenfunction and spectral properties

Abstract

We demonstrate that the normalised localization length β of the eigenfunctions of diluted (sparse) banded random matrices follows the scaling law β=x*/(1+x*). The scaling parameter of the model is defined as x*(beff2/N)δ, where beff is the average number of non-zero elements per matrix row, N is the matrix size, and δ 1. Additionally, we show that x* also scales the spectral properties of the model (up to certain sparsity) characterized by the spacing distribution of eigenvalues.