Spectral problems for operators with crossed magnetic and electric fields

Abstract

We obtain a representation formula for the derivative of the spectral shift function (λ; B, ε) related to the operators H0(B,ε) = (Dx - By)2 + Dy2 + ε x and H(B, ε) = H0(B, ε) + V(x,y), \: B > 0, ε > 0. We prove that the operator H(B, ε) has at most a finite number of embedded eigenvalues on which is a step to the proof of the conjecture of absence of embedded eigenvalues of H in . Applying the formula for '(λ, B, ε), we obtain a semiclassical asymptotics of the spectral shift function related to the operators H0(h) = (hDx - By)2 + h2Dy2 + ε x and H(h) = H0(h) + V(x,y).