Numerical studies of Anderson transition
arXiv:cond-mat/9908138
Abstract
We present numerical results for the statistics of $z$'s ($z$'s are defined as logarithm of eigenvalues of the transfermatrix $T^â T$) at the critical points of Anderson transition in 3D and 4D. The change of the density of $z$ due to the crossover from the metallic to the localized regime is described. Linear behavior $Ï(z)= z$ at the critical point in 3D is proven and discussed. In the insulating regime, the universal form of $Ï$ has been found.
LATEX, 6 .eps figures