Spectral properties of limiting solitons in optical fibers
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Authors
Amiranashvili, S
Bandelow, U.
Akhmediev, N.
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Optical Society of America
Abstract
It seems to be self-evident that stable optical pulses cannot
be considerably shorter than a single oscillation of the carrier field. From
the mathematical point of view the solitary solutions of pulse propagation
equations should loose stability or demonstrate some kind of singular behavior.
Typically, an unphysical cusp develops at the soliton top, preventing
the soliton from being too short. Consequently, the power spectrum of the
limiting solution has a special behavior: the standard exponential decay is
replaced by an algebraic one. We derive the shortest soliton and explicitly
calculate its spectrum for the so-called short pulse equation. The latter
applies to ultra-short solitons in transparent materials like fused silica that
are relevant for optical fibers.
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Source
Optics Express
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Open Access