2001
DOI: 10.1063/1.1326458
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One-dimensional crystal with a complex periodic potential

Abstract: A one-dimensional crystal model is constructed with a complex periodic potential. A wave function solution for the crystal model is derived without relying on Bloch functions. The new wave function solution of this model is shown to correspond to the solution for the probability amplitude of a two-level system. The energy discriminant is evaluated using an analytic formula derived from the probability amplitude solution, and based on an expansion parameter related to the energy and potential amplitude. From th… Show more

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Cited by 16 publications
(6 citation statements)
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“…We emphasize that these peculiar features are a direct consequence of the non-orthogonality of the PT Floquet-Bloch functions. In fact, the usual orthogonality condition (15) (that is valid in real crystals) is no longer observed in PT symmetric lattices. This skewness of the FB modes is an inherent characteristic of PT symmetric periodic potentials and has important consequences on their algebra.…”
Section: Band-gap Structurementioning
confidence: 92%
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“…We emphasize that these peculiar features are a direct consequence of the non-orthogonality of the PT Floquet-Bloch functions. In fact, the usual orthogonality condition (15) (that is valid in real crystals) is no longer observed in PT symmetric lattices. This skewness of the FB modes is an inherent characteristic of PT symmetric periodic potentials and has important consequences on their algebra.…”
Section: Band-gap Structurementioning
confidence: 92%
“…However, since the spectral problem (8) is not selfadjoint, the band structure is not generally real. On the other hand, the PT symmetry condition (2) provides useful clues on the reality of the spectrum [2,15,16,23,24]. In particular,…”
Section: Real Potentialsmentioning
confidence: 99%
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“…In what follows we show that equation (3) also admits a family of periodic solutions residing on a PT -like complex periodic lattice [23][24][25]. To demonstrate such states, we consider the following Jacobian periodic potentials:…”
Section: Self-focusing Casementioning
confidence: 97%
“…with ξ ∈ R and N being an integer, which has applications in one-dimensional crystal problems [9]. We shall be interested here in π -periodic or π -anti-periodic solutions of the corresponding Schrödinger equation, which are counterparts of the band edge wavefunctions (often called eigenfunctions) of theories for real periodic potentials (see, for example, [10]).…”
mentioning
confidence: 99%