Conductance of Finite Systems and Scaling in Localization Theory

I. M. Suslov

Published 2012-04-24Version 1

The conductance of finite systems plays a central role in the scaling theory of localization (Abrahams et al, 1979). Usually it is defined by the Landauer-type formulas, which remain open the following questions: (a) exclusion of the contact resistance in the many-channel case; (b) correspondence of the Landauer conductance with internal properties of the system; (c) relation with the diffusion coefficient D(\omega,q) of an infinite system. The answers to these questions are obtained below in the framework of two approaches: (1) self-consistent theory of localization by Vollhardt and Woelfle, and (2) quantum mechanical analysis based on the shell model. Both approaches lead to the same definition for the conductance of a finite system, closely related to the Thouless definition. In the framework of the self-consistent theory, the relations of finite-size scaling are derived and the Gell-Mann - Low functions \beta(g) for space dimensions d=1,2,3 are calculated. In contrast to the previous attempt by Vollhardt and Woelfle (1982), the metallic and localized phase are considered from the same standpoint, and the conductance of a finite system has no singularity at the critical point. In the 2D case, the expansion of \beta(g) in 1/g coincides with results of the \sigma-model approach on the two-loop level and depends on the renormalization scheme in higher loops; the use of dimensional regularization for transition to dimension d=2+\epsilon looks incompatible with the physical essence of the problem. The obtained results are compared with numerical and physical experiments. A situation in higher dimensions and the conditions for observation of the localization law \sigma\propto -i\omega for conductivity are discussed.