Inter-band tunneling near the merging transition of Dirac cones

TL;DR

This paper investigates inter-band tunneling near the merging transition of Dirac cones, generalizing the Landau-Zener problem with numerical and analytical methods, and compares results to recent experimental findings.

Contribution

It introduces a universal Hamiltonian framework for quadratic band crossings and provides a comprehensive analysis of tunneling probabilities across parameter ranges.

Findings

Numerical tunneling probabilities across parameters

Analytical solutions in various limits

Explanation of probability oscillations via interference

Abstract

Motivated by a recent experiment in a tunable graphene analog [L. Tarruell et al., Nature 483, 302 (2012)], we consider a generalization of the Landau-Zener problem to the case of a quadratic crossing between two bands in the vicinity of the merging transition of Dirac cones. The latter is described by the so-called universal hamiltonian. In this framework, the inter-band tunneling problem depends on two dimensionless parameters: one measures the proximity to the merging transition and the other the adiabaticity of the motion. Under the influence of a constant force, the probability for a particle to tunnel from the lower to the upper band is computed numerically in the whole range of these two parameters and analytically in different limits using (i) the Stueckelberg theory for two successive linear band crossings, (ii) diabatic perturbation theory, (iii) adiabatic perturbation theory and (iv) a modified Stueckelberg formula. We obtain a complete phase diagram and explain the presence of unexpected probability oscillations in terms of interferences between two poles in the complex time plane. We also compare our results to the above mentioned experiment.