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Autori principali: Flamarion, Marcelo V., Pelinovsky, Efim, Didenkulova, Ekaterina
Natura: Preprint
Pubblicazione: 2024
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Accesso online:https://arxiv.org/abs/2409.03790
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author Flamarion, Marcelo V.
Pelinovsky, Efim
Didenkulova, Ekaterina
author_facet Flamarion, Marcelo V.
Pelinovsky, Efim
Didenkulova, Ekaterina
contents Algebraic soliton interactions with a periodic or quasi-periodic random force are investigated using the Benjamin-Ono equation. The random force is modeled as a Fourier series with a finite number of modes and random phases uniformly distributed, while its frequency spectrum has a Gaussian shape centered at a peak frequency. The expected value of the averaged soliton wave field is computed asymptotically and compared with numerical results, showing strong agreement. We identify parameter regimes where the averaged soliton field splits into two steady pulses and a regime where the soliton field splits into two solitons traveling in opposite directions. In the latter case, the averaged soliton speeds are variable. In both scenarios, the soliton field is damped by the external force. Additionally, we identify a regime where the averaged soliton exhibits the following behavior: it splits into two distinct solitons and then recombines to form a single soliton. This motion is periodic over time.
format Preprint
id arxiv_https___arxiv_org_abs_2409_03790
institution arXiv
publishDate 2024
record_format arxiv
spellingShingle Soliton dynamics in random fields: The Benjamin-Ono equation framework
Flamarion, Marcelo V.
Pelinovsky, Efim
Didenkulova, Ekaterina
Pattern Formation and Solitons
Algebraic soliton interactions with a periodic or quasi-periodic random force are investigated using the Benjamin-Ono equation. The random force is modeled as a Fourier series with a finite number of modes and random phases uniformly distributed, while its frequency spectrum has a Gaussian shape centered at a peak frequency. The expected value of the averaged soliton wave field is computed asymptotically and compared with numerical results, showing strong agreement. We identify parameter regimes where the averaged soliton field splits into two steady pulses and a regime where the soliton field splits into two solitons traveling in opposite directions. In the latter case, the averaged soliton speeds are variable. In both scenarios, the soliton field is damped by the external force. Additionally, we identify a regime where the averaged soliton exhibits the following behavior: it splits into two distinct solitons and then recombines to form a single soliton. This motion is periodic over time.
title Soliton dynamics in random fields: The Benjamin-Ono equation framework
topic Pattern Formation and Solitons
url https://arxiv.org/abs/2409.03790