Low lying spectral gaps induced by slowly varying magnetic fields

TL;DR

This paper analyzes how slowly varying magnetic fields induce low-lying spectral gaps in a two-dimensional periodic Schrödinger operator, using an effective magnetic matrix and pseudo-differential calculus to reveal spectral islands.

Contribution

It introduces a Hofstadter-like effective magnetic matrix for slowly varying fields without requiring spectral gaps in the non-magnetic operator.

Findings

Spectral islands appear at the bottom of the spectrum.

Gaps are separated by spectral islands, resembling Landau levels.

The effective matrix accurately describes low-lying spectrum.

Abstract

We consider a periodic Schr\"odinger operator in two dimensions perturbed by a weak magnetic field whose intensity slowly varies around a positive mean. We show in great generality that the bottom of the spectrum of the corresponding magnetic Schr\"odinger operator develops spectral islands separated by gaps, reminding of a Landau-level structure. First, we construct an effective Hofstadter-like magnetic matrix which accurately describes the low lying spectrum of the full operator. The construction of this effective magnetic matrix does not require a gap in the spectrum of the non-magnetic operator, only that the first and the second Bloch eigenvalues do not cross but their ranges might overlap. The crossing case is more difficult and will be considered elsewhere. Second, we perform a detailed spectral analysis of the effective matrix using a gauge-covariant magnetic pseudo-differential calculus adapted to slowly varying magnetic fields. As an application, we prove in the overlapping case the appearance of spectral islands separated by gaps.