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

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∈[12,1), we prove the existence of the solutions in space Bsp,1( R) with s≥ 1+1p and p <1a-12, the existence and uniqueness of the solutions in space Bsp,1( R) with s≥ 1+2a-\1p,1p'\, and the local well-posedness in space Bsp,1( R) with s> 1+2a-\1p,1p'\. When a>1, we obtain the existence of the solutions in space Bsp,1( R) with s≥ a+\1p,12\ and the local well-posedness in space Bsp,1( R) with s≥ 1+a+\1p,12\. Moreover, we obtain two results about the global solutions.