English

Spectral asymptotics for two-dimensional Dirac operators in thin waveguides

Spectral Theory 2022-07-19 v1 Mathematical Physics Analysis of PDEs math.MP Quantum Physics

Abstract

We consider the two-dimensional Dirac operator with infinite mass boundary conditions posed in a tubular neighborhood of a C4C^4-planar curve. Under generic assumptions on its curvature κ\kappa, we prove that in the thin-width regime the splitting of the eigenvalues is driven by the one dimensional Schr\"odinger operator on L2(R)L^2(\mathbb R) Le:=d2ds2κ2π2 \mathcal{L}_e := -\frac{d^2}{ds^2} - \frac{\kappa^2}{\pi^2} with a geometrically induced potential. The eigenvalues are shown to be at distance of order ε\varepsilon from the essential spectrum, where 2ε2\varepsilon is the width of the waveguide. This is in contrast with the non-relativistic counterpart of this model, for which they are known to be at a finite distance.

Keywords

Cite

@article{arxiv.2207.08700,
  title  = {Spectral asymptotics for two-dimensional Dirac operators in thin waveguides},
  author = {William Borrelli and Nour Kerraoui and Thomas Ourmières-Bonafos},
  journal= {arXiv preprint arXiv:2207.08700},
  year   = {2022}
}

Comments

11 pages. To appear on "Indam Quantum Meetings 22" proceedings

R2 v1 2026-06-25T01:01:04.103Z