Localization-delocalization transitions in a two-dimensional quantum percolation model: von Neumann entropy studies

Abstract

In two-dimensional quantum site-percolation square lattice models, the von Neumann entropy is extensively studied numerically. At a certain eigenenergy, the localization-delocalization transition is reflected by the derivative of von Neumann entropy which is maximal at the quantum percolation threshold pq. The phase diagram of localization-delocalization transitions is deduced in the extrapolation to infinite system sizes. The non-monotonic eigenenergies dependence of pq and the lowest value pq0.665 are found. At localized-delocalized transition points, the finite scaling analysis for the von Neumann entropy is performed and it is found the critical exponents not to be universal. These studies provide a new evidence that the existence of a quantum percolation threshold pq<1 in the two-dimensional quantum percolation problem.