Modulational instability in optical fibers with randomly kicked normal dispersion

We study modulational instability (MI) in optical fibers with random group-velocity dispersion (GVD). We consider Gaussian and dichotomous colored stochastic processes. We resort to different analytical methods (namely, the cumulant expansion and the functional approach) and assess their reliability in estimating the MI gain of stochastic origin. If the power spectral density (PSD) of the GVD fluctuations is centered at null wavenumber, we obtain low-frequency MI sidelobes which converge to those given by a white noise perturbation when the correlation length tends to 0. If instead the stochastic processes are modulated in space, one or more MI sidelobe pairs corresponding to the well-known parametric resonance (PR) condition can be found. A transition from small and broad sidelobes to peaks nearly indistinguishable from PR-MI is predicted, in the limit of large perturbation amplitudes and correlation lengths of the random process. We find that the cumulant expansion provides good analytical estimates for small PSD values and small correlation lengths, when the MI gain is very small. The functional approach is rigorous only for the dichotomous processes, but allows us to model a wider range of parameters and to predict the existence of MI sidelobes comparable to those observed in homogeneous fibers of anomalous GVD.

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“…As in Ref. [21], the MI of stochastic origin is related to the growth rate of the second moment. The eigenvalues of the matrix in Eq.…”

Section: B Cumulant Expansion (Second Moments)mentioning

confidence: 79%

“…We aim at studying the MI problem in a class of random-GVD fibers that is both experimentally accessible and theoretically tractable. In [21], we studied the case of a GVD perturbed by randomly located sharp and large kicks. Two different families of random processes were chosen to generate their mutual spacing and amplitude.…”

Section: Introductionmentioning

confidence: 99%

Stochastic modulational instability in the nonlinear Schrödinger equation with colored random dispersion

et al. 2022

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“…Following [2,4], Eq. ( 1) is linearized around the continuous wave solution U 0 (z) = √ P exp(iγPz) and the resulting system for sideband phase-quadrature variables (x 1 , x 2 ) is written as a product of random matrices, depending on the random variables ∆L n .…”

Section: Model and Resultsmentioning

confidence: 99%

“…Large random fluctuations of GVD were studied in Ref. [4], in the form of localised abrupt changes (kicks) around an average normal GVD. We apply the method developed in our previous work to compute the MI gain in a DM system where the length of each segment fluctuates randomly with a certain probability distribution.…”

Section: Introductionmentioning

confidence: 99%

Large Modulational Instability Gain in Random Dispersion-Managed Fibers

Armaroli

Kudlinski

Mussot

et al. 2022

Optica Advanced Photonics Congress 2022

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“…In the late 90s, the white noise process (an exactly solvable model) was considered [9,[13][14][15]. Only recently different random processes were considered: localized GVD kicks [16] or coloured processes of low-pass or band-pass type [17].…”

Section: Introductionmentioning

confidence: 99%

Random telegraph dispersion management: modulational instability

Armaroli,

Conforti

2024

J. Opt. Soc. Am. B

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We study modulational instability in a fiber system resembling a dispersion-managed link where the sign of the group-velocity dispersion varies randomly according to a telegraph process. We find that the instability gain of stochastic origin converges, for long fiber segment mean length (the inverse of the transition rate between the two values), to the conventional values found in a homogeneous anomalous dispersion fiber. For short fiber segments, the gain bands are broadened and the maximum gain decreases. By employing correlation splitting formulas, we obtain closed form equations that allow us to estimate the instability gain from the linearized nonlinear Schrödinger equation. We compare the analytical to the numerical results obtained in a Monte Carlo spirit. The analysis is proven to be correct not only for a fluctuating group-velocity dispersion, but also including fourth-order dispersion (both constant or varying according to a synchronous or independent telegraph process). These results may allow researchers to tailor and control modulational instability sidebands, with applications in telecommunications and parametric photon sources.

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Modulational instability in optical fibers with randomly kicked normal dispersion

Cited by 5 publications

References 44 publications

Stochastic modulational instability in the nonlinear Schrödinger equation with colored random dispersion

Stochastic modulational instability in the nonlinear Schrödinger equation with colored random dispersion

Large Modulational Instability Gain in Random Dispersion-Managed Fibers

Random telegraph dispersion management: modulational instability

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