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Wannier-Stark localization in one-dimensional amplitude-chirped lattices

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arxiv 2306.05193 v2 pith:AK2RZMME submitted 2023-06-08 cond-mat.dis-nn quant-ph

Wannier-Stark localization in one-dimensional amplitude-chirped lattices

classification cond-mat.dis-nn quant-ph
keywords latticesfieldlocalizationamplitude-chirpedeigenstatesladdersnon-hermitianalpha
verification ladder T0 review T1 audit T2 compute T3 formal T4 reserved
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We study the Wannier-Stark (WS) localization in one-dimensional amplitude-chirped lattices with the $j$th onsite potential modulated by a function $Fj\cos(2\pi \alpha j)$, where $F$ is the external field with a period determined by $\alpha=p/q$ ($p$ and $q$ are coprime integers). In the Hermitian (or non-Hermitian) systems with real (or imaginary) fields, we can obtain real (or imaginary) WS ladders in the eigenenergy spectrum. In most cases with $q \geq 2$, there are multiple WS ladders with all the eigenstates localized in the strong field limit. However, in the lattices with $q=4$, the energy-dependent localization phenomenon emerges due to the presence of both spatially periodic and linearly increasing behaviors in the onsite potential. About half the number of eigenstates are gathered at the band center and can extend over a wide region or even the full range of the lattice, even when the field becomes very strong. Moreover, in the non-Hermitian lattices with odd $q$, some of the WS ladders become doubly degenerate, where the eigenstates are evenly distributed at two neighboring sites in a wide regime of field strength. Our work opens an avenue for exploring WS localization in both Hermitian and non-Hermitian amplitude-chirped lattices.

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