# Integrability, existence of global solutions and wave breaking criteria   for a generalization of the Camassa-Holm equation

**Authors:** Priscila Leal da Silva, Igor Leite Freire

arXiv: 1906.00304 · 2020-07-27

## TL;DR

This paper investigates a generalized Camassa-Holm equation, establishing conditions for global solutions and wave breaking, and analyzing its integrability, showing it is bi-Hamiltonian only in specific cases and describing pseudo-spherical surfaces.

## Contribution

It provides new criteria for global existence and wave breaking, and demonstrates the unique integrability of the reduced Dullin-Gotwald-Holm equation within this family.

## Key findings

- Global well-posedness under certain derivative bounds
- Wave breaking occurs under mild conditions
- Only the Dullin-Gotwald-Holm equation is bi-Hamiltonian

## Abstract

Recent generalizations of the Camassa-Holm equation are studied from the point of view of existence of global solutions, criteria for wave breaking phenomena and integrability. We provide conditions, based on lower bounds for the first spatial derivative of local solutions, for global well-posedness for the family under consideration in Sobolev spaces. Moreover, we prove that wave breaking phenomena occurs under certain mild hypothesis. Regarding integrability, we apply the machinery developed by Dubrovin [Commun. Math. Phys. 267, 117--139 (2006)] to prove that there exists a unique bi-hamiltonian structure for the equation only when it is reduced to the Dullin-Gotwald-Holm equation. Our results suggest that a recent shallow water model incorporating Coriollis efects is integrable only in specific situations. Finally, to finish the scheme of geometric integrability of the family of equations initiated in a previous work, we prove that the Dullin-Gotwald-Holm equation describes pseudo-spherical surfaces.

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## References

57 references — full list in the complete paper: https://tomesphere.com/paper/1906.00304/full.md

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Source: https://tomesphere.com/paper/1906.00304