The Cauchy problem for the integrable RZQ equation

Abstract

In this paper we study a new integrable fifth-order Camassa-Holm (CH)-type equation derived by Reyes, Zhu, and Qiao, which we call the RZQ equation. The m-form of this equation possesses a striking similarity to the m-form of the CH equation. However, unlike the CH equation, the nonlocal form of this equation cannot be interpreted as a nonlocal perturbation of Burgers' equation. We prove that the initial value problem corresponding to the RZQ equation is well-posed in the sense of Hadamard, in Sobolev spaces Hs, s>7/2. We further show that the data-to-solution map is not uniformly continuous in the Hs topology, though it is H\"older continuous in a weaker topology. The initial value problem corresponding to the RZQ equation is ill-posed in Hs for s<7/2.