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Main Authors: Boulton, Lyonell, Farmakis, George, Pelloni, Beatrice, Smith, David A.
Format: Preprint
Published: 2024
Subjects:
Online Access:https://arxiv.org/abs/2403.01117
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author Boulton, Lyonell
Farmakis, George
Pelloni, Beatrice
Smith, David A.
author_facet Boulton, Lyonell
Farmakis, George
Pelloni, Beatrice
Smith, David A.
contents We study the presence of a non-trivial revival effect in the solution of linear dispersive boundary value problems for two benchmark models which arise in applications: the Airy equation and the dislocated Laplacian Schr{ö}dinger equation. In both cases, we consider boundary conditions of Dirichlet-type. We prove that, at suitable times, jump discontinuities in the initial profile are revived in the solution not only as jump discontinuities but also as logarithmic cusp singularities. We explicitly describe these singularities and show that their formation is due to interactions between the symmetries of the underlying spatial operators with the periodic Hilbert transform.
format Preprint
id arxiv_https___arxiv_org_abs_2403_01117
institution arXiv
publishDate 2024
record_format arxiv
spellingShingle Jumps and cusps: a new revival effect in local dispersive PDEs
Boulton, Lyonell
Farmakis, George
Pelloni, Beatrice
Smith, David A.
Analysis of PDEs
35P05
We study the presence of a non-trivial revival effect in the solution of linear dispersive boundary value problems for two benchmark models which arise in applications: the Airy equation and the dislocated Laplacian Schr{ö}dinger equation. In both cases, we consider boundary conditions of Dirichlet-type. We prove that, at suitable times, jump discontinuities in the initial profile are revived in the solution not only as jump discontinuities but also as logarithmic cusp singularities. We explicitly describe these singularities and show that their formation is due to interactions between the symmetries of the underlying spatial operators with the periodic Hilbert transform.
title Jumps and cusps: a new revival effect in local dispersive PDEs
topic Analysis of PDEs
35P05
url https://arxiv.org/abs/2403.01117