Interpretation of high-dimensional numerical results for Anderson transition

Abstract

Existence of the upper critical dimension dc2=4 for the Anderson transition is a rigorous consequence of the Bogoliubov theorem on renormalizability of φ4 theory. For dimensions d 4, one-parameter scaling does not hold, and all existent numerical data should be reinterpreted. These data are exhausted by results for d=4,5 from scaling in quasi-one-dimensional systems, and results for d=4,5,6 from level statistics. All these data are compatible with the theoretical scaling dependencies obtained from self-consistent theory of localization by Vollhardt and Woelfle. The critical discussion is given for a widespread point of view that dc2=∞.