The fate of Landau levels under δ-interactions

Abstract

We consider the self-adjoint Landau Hamiltonian H0 in L2(R2) whose spectrum consists of infinitely degenerate eigenvalues q, q ∈ Z+, and the perturbed operator H = H0 + δ, where ⊂ R2 is a regular Jordan C1,1-curve, and ∈ Lp(;R), p>1, has a constant sign. We investigate Ker(H -q), q ∈ Z+, and show that generically 0 ≤ dim \, Ker(H -q) - dim \, Ker(Tq( δ)) < ∞, where Tq( δ) = pq ( δ)pq, is an operator of Berezin-Toeplitz type, acting in pq L2(R2), and pq is the orthogonal projection on Ker\,(H0 -q). If ≠ 0 and q = 0, we prove that Ker\,(T0( δ)) = \0\. If q ≥ 1, and = Cr is a circle of radius r, we show that dim \, Ker (Tq(δCr)) ≤ q, and the set of r ∈ (0,∞) for which dim \, Ker(Tq(δCr)) ≥ 1, is infinite and discrete.