Symmetric waves are traveling waves of some shallow water scalar equations

Khorbatly, Bashar

doi:10.1002/mma.8830

Math Methods in App Sciences

2022

DOI: 10.1002/mma.8830

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Symmetric waves are traveling waves of some shallow water scalar equations

Bashar Khorbatly

Abstract: Following a straightforward proof for symmetric solutions to be traveling waves by Pei (Exponential decay and symmetry of solitary waves to Degasperis‐Procesi equation. Journal of Differential Equations. 2020;269(10):7730‐7749), we prove that classical symmetric solutions of the highly nonlinear shallow water equation recently derived by Quirchmayr (A new highly nonlinear shallow water wave equation. Journal of Evolution Equations. 2016;16(3):539‐556) are indeed traveling waves, with further information on the… Show more

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2024

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On the Steadiness of Symmetric Solutions to Two Dimensional Dispersive Models

Pei,

Xiao,

Zhang

2024

J. Math. Fluid Mech.

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On the Steadiness of Symmetric Solutions to Two Dimensional Dispersive Models

Pei,

Xiao,

Zhang

2024

J. Math. Fluid Mech.

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The highly nonlinear shallow water equation: local well-posedness, wave breaking data and non-existence of sech$$^2$$ solutions

Khorbatly

2024

Monatsh Math

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In the context of the initial data and an amplitude parameter $$\varepsilon $$ ε , we establish a local existence result for a highly nonlinear shallow water equation on the real line. This result holds in the space $$H^k$$ H k as long as $$k>5/2$$ k > 5 / 2 . Additionally, we illustrate that the threshold time for the occurrence of wave breaking in the surging type is on the order of $$\varepsilon ^{-1},$$ ε - 1 , while plunging breakers do not manifest. Lastly, in accordance with ODE theory, it is demonstrated that there are no exact solitary wave solutions in the form of sech and $$sech^2$$ s e c h 2 .

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Symmetric waves are traveling waves of some shallow water scalar equations

Cited by 2 publications

References 20 publications

On the Steadiness of Symmetric Solutions to Two Dimensional Dispersive Models

On the Steadiness of Symmetric Solutions to Two Dimensional Dispersive Models

The highly nonlinear shallow water equation: local well-posedness, wave breaking data and non-existence of sech$$^2$$ solutions

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