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Bibliographic Details
Main Authors: Coz, Stefan Le, Pelinovsky, Dmitry E., Schneider, Guido
Format: Preprint
Published: 2025
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Online Access:https://arxiv.org/abs/2505.03268
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author Coz, Stefan Le
Pelinovsky, Dmitry E.
Schneider, Guido
author_facet Coz, Stefan Le
Pelinovsky, Dmitry E.
Schneider, Guido
contents The purpose of this work is to introduce a concept of traveling waves in the setting of periodic metric graphs. It is known that the nonlinear Schr{ö}dinger (NLS) equation on periodic metric graphs can be reduced asymptotically on long but finite time intervals to the homogeneous NLS equation, which admits traveling solitary wave solutions. In order to address persistence of such traveling waves beyond finite time intervals, we formulate the existence problem for traveling waves via spatial dynamics. There exist no spatially decaying (solitary) waves because of an infinite-dimensional center manifold in the spatial dynamics formulation. Existence of traveling modulating pulse solutions which are solitary waves with small oscillatory tails at very long distances from the pulse core is proven by using a local center-saddle manifold. We show that the variational formulation fails to capture existence of such modulating pulse solutions even in the singular limit of zero wave speeds where true (standing) solitary waves exist. Propagation of a traveling solitary wave and formation of a small oscillatory tail outside the pulse core is shown in numerical simulations of the NLS equation on the periodic graph.
format Preprint
id arxiv_https___arxiv_org_abs_2505_03268
institution arXiv
publishDate 2025
record_format arxiv
spellingShingle Traveling waves in periodic metric graphs via spatial dynamics
Coz, Stefan Le
Pelinovsky, Dmitry E.
Schneider, Guido
Analysis of PDEs
The purpose of this work is to introduce a concept of traveling waves in the setting of periodic metric graphs. It is known that the nonlinear Schr{ö}dinger (NLS) equation on periodic metric graphs can be reduced asymptotically on long but finite time intervals to the homogeneous NLS equation, which admits traveling solitary wave solutions. In order to address persistence of such traveling waves beyond finite time intervals, we formulate the existence problem for traveling waves via spatial dynamics. There exist no spatially decaying (solitary) waves because of an infinite-dimensional center manifold in the spatial dynamics formulation. Existence of traveling modulating pulse solutions which are solitary waves with small oscillatory tails at very long distances from the pulse core is proven by using a local center-saddle manifold. We show that the variational formulation fails to capture existence of such modulating pulse solutions even in the singular limit of zero wave speeds where true (standing) solitary waves exist. Propagation of a traveling solitary wave and formation of a small oscillatory tail outside the pulse core is shown in numerical simulations of the NLS equation on the periodic graph.
title Traveling waves in periodic metric graphs via spatial dynamics
topic Analysis of PDEs
url https://arxiv.org/abs/2505.03268