Exact calculation of multifractal exponents of the critical wave function of Dirac fermions in a random magnetic field
arXiv:cond-mat/9706084 · doi:10.1103/PhysRevB.56.10668
Abstract
The multifractal scaling exponents are calculated for the critical wave function of a two-dimensional Dirac fermion in the presence of a random magnetic field. It is shown that the problem of calculating the multifractal spectrum maps into the thermodynamics of a static particle in a random potential. The multifractal exponents are simply given in terms of thermodynamic functions, such as free energy and entropy, which are argued to be self-averaging in the thermodynamic limit. These thermodynamic functions are shown to coincide exactly with those of a Generalized Random Energy Model, in agreement with previous results obtained using Gaussian field theories in an ultrametric space.
11 pages, REVTEX, manuscript as published in Phys. Rev. B, minor changes with respect to first version