/fermi_sea_local_driving

Matlab codes used to generate the figures in the paper 'Nonsmooth and level-resolved dynamics illustrated with the tight binding model', arXiv:1404.4280

Primary LanguageMATLAB

fermi_sea_local_driving

Matlab codes used to generate figures in the paper 'Nonsmooth and level-resolved dynamics illustrated with the tight binding model', arXiv:1404.4280

https://arxiv.org/abs/1404.4280

Abstract

We point out that in the first order time-dependent perturbation theory, the transition probability may behave nonsmoothly in time and have kinks periodically. Moreover, the detailed temporal evolution can be sensitive to the exact locations of the eigenvalues in the continuum spectrum, in contrast to coarse-graining ideas. Underlying this nonsmooth and level-resolved dynamics is a simple equality about the sinc function $\sinc x \equiv \sin x / x$. These physical effects appear in many systems with approximately equally spaced spectra, and is also robust for larger-amplitude coupling beyond the domain of perturbation theory. We use a one-dimensional periodically driven tight-binding model to illustrate these effects, both within and outside the perturbative regime.

Usage

Just run the matlab scripts to generate the figures.