Waves in almost-periodic particle chains
release_ct4n2dwc75dd7m7qag5czbba7e
by
Yarden Mazor,
Ben Z. Steinberg
2014
Abstract
Almost periodic particle chains exhibit peculiar propagation properties that
are not observed in perfectly periodic ones. Furthermore, since they inherently
support non-negligible long-range interactions and radiation through the
surrounding free-space, nearest-neighbor approximations cannot be invoked.
Hence the governing operator is fundamentally different than that used in
traditional analysis of almost periodic structures, e.g. Harper's model and
Almost-Mathieu difference equations. We present a mathematical framework for
the analysis of almost periodic particle chains, and study their electrodynamic
properties. We show that they support guided modes that exhibit a complex
interaction mechanism with the light-cone. These modes possess a
two-dimensional fractal-like structure in the frequency-wavenumber space, such
that a modal phase-velocity cannot be uniquely defined. However, a well defined
group velocity is revealed due to the fractal's inner-structure.
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