Well-posedness and global solutions to the higher order Camassa-Holm equations with fractional inertia operator in Besov space

TL;DR

This paper investigates the well-posedness and existence of global solutions for higher-order Camassa-Holm equations with fractional inertia operators in Besov spaces, providing conditions for solutions' existence, uniqueness, and regularity.

Contribution

It establishes new well-posedness and global solution results for higher-order Camassa-Holm equations with fractional inertia operators in Besov spaces, extending previous understanding.

Findings

Existence of solutions in specific Besov spaces for $a eq1$.

Uniqueness and local well-posedness under certain regularity conditions.

Global solutions established for particular parameter ranges.

Abstract

In this paper, we study well-posedness and the global solutions to the higher-order Camassa-Holm equations with fractional inertia operator in Besov space. When $a\in[\frac{1}{2},1),$ we prove the existence of the solutions in space $B^s_{p,1}(\mathbb R)$ with $s\geq 1+\frac{1}{p}$ and $p <\frac{1}{a-\frac{1}{2}}$, the existence and uniqueness of the solutions in space $B^s_{p,1}(\mathbb R)$ with $s\geq 1+2a-\min\{\frac{1}{p},\frac{1}{p'}\},$ and the local well-posedness in space $B^s_{p,1}(\mathbb R)$ with $s> 1+2a-\min\{\frac{1}{p},\frac{1}{p'}\}$. When $a>1,$ we obtain the existence of the solutions in space $B^s_{p,1}(\mathbb R)$ with $s\geq a+\max\{\frac{1}{p},\frac{1}{2}\}$ and the local well-posedness in space $B^s_{p,1}(\mathbb R)$ with $s\geq 1+a+\max\{\frac{1}{p},\frac{1}{2}\}$. Moreover, we obtain two results about the global solutions.