The Cauchy problem for higher-order modified Camassa-Holm equations on the circle

Abstract

In this paper, we investigate the Cauchy problem for the shallow water type equation eqnarray* ut+∂x2j+1u + 12∂x(u2)+ ∂x(1-∂x2)-1[u2+12ux2]=0 eqnarray* with low regularity data in the periodic settings. Himonas and Misiolek (Communications in Partial Differential Equations, 23(1998), 123-139.) have proved that the problem is locally well-posed for small initial data in Hs(T) with s≥-j2+1,j∈ N+ with the aid of the standard Fourier restriction norm method. To the best of our knowledge, there is no result of well-posedness about the problem when s<-j2+1. In this paper, firstly, we prove that the bilinear estimate related to the nonlinear term of the equation in standard Bourgain space is invalid with s<-j2+1. Then we prove that the Cauchy problem for the periodic shallow water-type equation is locally well-posed in Hs(T) with -j+32< s<-j2+1,j≥2 for arbitrary initial data. The novelty is that we introduce some new function spaces and give a useful relationship among new spaces.