Localization of two-dimensional massless Dirac fermions in a magnetic quantum dot

Abstract

We consider a two-dimensional massless Dirac operator H in the presence of a perturbed homogeneous magnetic field B=B0+b and a scalar electric potential V. For V∈ L locp(2), p∈(2,∞], and b∈ L locq(2), q∈(1,∞], both decaying at infinity, we show that states in the discrete spectrum of H are superexponentially localized. We establish the existence of such states between the zeroth and the first Landau level assuming that V=0. In addition, under the condition that b is rotationally symmetric and that V satisfies certain analyticity condition on the angular variable, we show that states belonging to the discrete spectrum of H are Gaussian-like localized.