Two-dimensional Bloch electrons in perpendicular magnetic fields: an exact calculation of the Hofstadter butterfly spectrum

TL;DR

This paper presents an exact numerical calculation of the Hofstadter butterfly spectrum for two-dimensional electrons in a magnetic field, covering all potential and field strengths without approximations.

Contribution

It introduces a precise computational method for the full spectrum, enabling analysis beyond traditional strong potential or strong field approximations.

Findings

Exact spectrum calculation matches Hofstadter model in strong potential limit

Spectrum evolution from Landau levels to Hofstadter fractal pattern

Comparison between exact results and approximate models

Abstract

The problem of two-dimensional, independent electrons subject to a periodic potential and a uniform perpendicular magnetic field unveils surprisingly rich physics, as epitomized by the fractal energy spectrum known as Hofstadter's Butterfly. It has hitherto been addressed using various approximations rooted in either the strong potential or the strong field limiting cases. Here we report calculations of the full spectrum of the single-particle Schr\"{o}dinger equation without further approximations. Our method is exact, up to numerical precision, for any combination of potential and uniform field strength. We first study a situation that corresponds to the strong potential limit, and compare the exact results to the predictions of a Hofstadter-like model. We then go on to analyze the evolution of the fractal spectrum from a Landau-like nearly-free electron system to the Hofstadter tight-binding limit by tuning the amplitude of the modulation potential.