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arxiv: 1709.05575 · v2 · pith:FJAEIJMEnew · submitted 2017-09-16 · 🧮 math-ph · cond-mat.mes-hall· math.AP· math.MP· quant-ph

Wavepackets in inhomogeneous periodic media: propagation through a one-dimensional band crossing

classification 🧮 math-ph cond-mat.mes-hallmath.APmath.MPquant-ph
keywords wavepacketbandcrossingperiodictextitconsiderdynamicsepsilon
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We consider a model of an electron in a crystal moving under the influence of an external electric field: Schroedinger's equation in one spatial dimension with a potential which is the sum of a periodic function $V$ and a smooth function $W$. We assume that the period of $V$ is much shorter than the scale of variation of $W$ and denote the ratio of these scales by $\epsilon$. We consider the dynamics of $\textit{semiclassical wavepacket}$ asymptotic (in the limit $\epsilon \downarrow 0$) solutions which are spectrally localized near to a $\textit{crossing}$ of two Bloch band dispersion functions of the periodic operator $- \frac{1}{2} \partial_z^2 + V(z)$. We show that the dynamics is qualitatively different from the case where bands are well-separated: at the time the wavepacket is incident on the band crossing, a second wavepacket is `excited' which has $\textit{opposite}$ group velocity to the incident wavepacket. We then show that our result is consistent with the solution of a `Landau-Zener'-type model.

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