The Cauchy problem for the shallow water typ equations in low regularity spaces on the circle

Abstract

In this paper, we investigate the Cauchy problem for the shallow water type equation \[ ut+∂x3u + 12∂x(u2)+∂x (1-∂x2)-1[u2+12ux2]=0,x∈ T=/2π λ \] with low regularity data in the periodic settings and λ≥1. We prove that the bilinear estimate in Xs,b with s<12 is invalid. We also prove that the problem is locally well-posed in Hs(T) with 16<s<12 for small initial data. The result of this paper improves the result of case j=1 of Himonas and Misiolek (Communications in Partial Differential Equations, 23(1998), 123-139.). The new ingredients are some new function spaces and some new Strichartz estimates.