10.6084/m9.figshare.1012176.v1
D N Maksimov
I Yu Chesnokov
D V Makarov
A R Kolovsky
Logarithm of |Ψ(<em>x</em>, <em>y</em>, <em>t</em>)|<sup>2</sup> at <em>t</em> = 10 000 for α = 0 (left panel) and α = 1/8 (right panel)
2013
IOP Publishing
phenomenon
analyse dynamics
quantum particle
tunnelling
square lattice
landau
Hall configuration
direction orthogonal
right panel
gauge field
2013-06-13 00:00:00
article
https://iop.figshare.com/articles/_Logarithm_of_em_x_em_em_y_em_em_t_em_sup_2_sup_at_em_t_em_10_000_for_0_left_panel_and_1_8_right_pan/1012176
<p><strong>Figure 8.</strong> Logarithm of |Ψ(<em>x</em>, <em>y</em>, <em>t</em>)|<sup>2</sup> at <em>t</em> = 10 000 for α = 0 (left panel) and α = 1/8 (right panel). The other parameters are <em>v<sub>x</sub></em> = <em>v<sub>y</sub></em> = 0.5, <em>F</em> = 0.015 and F_x/F_y=(\sqrt{5}-1)/4.</p> <p><strong>Abstract</strong></p> <p>We analyse dynamics of a quantum particle in a square lattice in the Hall configuration beyond the single-band approximation. For vanishing gauge (magnetic) field this dynamics is defined by the inter-band Landau–Zener tunnelling, which is responsible for the phenomenon known as the electric breakdown. We show that in the presence of a gauge field this phenomenon is absent, at least, in its common sense. Instead, the Landau–Zener tunnelling leads to the appearance of a finite current which flows in the direction orthogonal to the vector of a potential (electric) field.</p>