Localization Theory in Zero Dimension and the Structure of Diffusion Poles

Abstract

The 1/[-iω + D(ω, q)q2] diffusion pole in the localized phase transfers to the 1/ω Berezinskii-Gorkov singularity, which can be analyzed by the instanton method (M V. Sadovskii, 1982; J. L. Cardy, 1978). Straightforward use of this approach leads to contradictions, which do not disappear even if the problem is extremely simplied by taking zero-dimensional limit. On the contrary, they are extremely sharpened in this case and become paradoxes. The main paradox is specified by the following statements: (i) the 1/ω singularity is determined by high orders of perturbation theory, (ii) the high-order behaviors for two quantities RA and URA are the same, and (iii) RA has the 1/ω singularity, whereas URA does not have it. Solution to the paradox indicates that the instanton method makes it possible to obtain only the 1/(ω + iγ) singularity, where the parameter γ remains indefinite and must be determined from additional conditions. This conceptually confirms the necessity of the self-consistent treatment for the diffusion coefficient that is used in the Vollhardt-Wolfle type theories.