On the asymptotic behavior of solutions to the Benjamin-Ono equation

Claudio Muñoz; Gustavo Ponce

doi:10.1090/proc/14643

journal article Open Access Jun 10, 2019

On the asymptotic behavior of solutions to the Benjamin-Ono equation

Claudio Muñoz

Gustavo Ponce

Proceedings of the American Mathematical Society Vol. 147 No. 12 pp. 5303-5312 · American Mathematical Society (AMS)

View at Publisher Save 10.1090/proc/14643

Abstract

We prove that the limit infimum, as time

t

\,t\,

goes to infinity, of any uniformly bounded in time

H
1

∩

L
1

H^1\cap L^1

solution to the Benjamin-Ono equation converge to zero locally in an increasing in time region of space of order

t

/

log

⁡

t

\,t/\log t

. Also for a solution with a mild

L
1

L^1

-norm growth in time, its limit infimum must converge to zero, as time goes to infinity, locally in an increasing on time region of space of order depending of the rate of growth of its

L
1

L^1

-norm. In particular, we discard the existence of breathers and other solutions for the BO model moving with a speed “slower” than a soliton.

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Metrics

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Citations

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References

Details

Published: Jun 10, 2019
Vol/Issue: 147(12)
Pages: 5303-5312
License: View

Authors

C

Claudio Muñoz

CNRS and Departamento de Ingeniería Matemática and Centro de Modelamiento Matemático (UMI 2807 CNRS), Universidad de Chile, Santiago, Chile

G

Gustavo Ponce

Cite This Article

Claudio Muñoz, Gustavo Ponce (2019). On the asymptotic behavior of solutions to the Benjamin-Ono equation. Proceedings of the American Mathematical Society, 147(12), 5303-5312. https://doi.org/10.1090/proc/14643

On the asymptotic behavior of solutions to the Benjamin-Ono equation

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