On localization of eigenfunctions of the magnetic Laplacian

Abstract

Let ⊂ Rd and consider the magnetic Laplace operator given by H(A) = (- i∇ - A(x))2, where A: → Rd, subject to Dirichlet eigenfunction. This operator can, for certain vector fields A, have eigenfunctions H(A) = λ that are highly localized in a small region of . The main goal of this paper is to show that if || assumes its maximum in x0 ∈ , then A behaves `almost' like a conservative vector field in a 1/λ-neighborhood of x0 in a precise sense: we expect localization in regions where |curl A | is small. The result is illustrated with numerical examples.