On the spectrum of the periodic Dirac operator

Abstract

The absolute continuity of the spectrum for the periodic Dirac operator D=Σj=1n(-i ∂∂ xj-Aj) αj + V(0)+ V(1), x∈ Rn, n≥ 3, is proved given that either A∈ C(Rn;Rn) Hqloc(Rn;Rn), 2q > n-2, or the Fourier series of the vector potential A:Rn Rn is absolutely convergent. Here, V(s)=( V(s))* are continuous matrix functions and V(s) αj=(-1s αj V(s) for all anticommuting Hermitian matrices αj, αj2= I, s=0,1.