Lower Regularity Solutions of the Non-homogeneous Boundary-Value Problem for a Higher Order Boussinesq Equation in a Quarter Plane

Abstract

We continue to study the initial-boundary-value problem of the sixth order Boussinesq equation in a quarter plane with non-homogeneous boundary conditions: equation* cases utt-uxx+β uxxxx-uxxxxxx+(u2)xx=0, x,t∈ R+,\\ u(x,0)= (x), ut(x,0)= ''(x), \\ u(0,t)=h1(t), uxx(0,t)=h2(t), uxxxx(0,t)=h3(t), cases equation* where β=1. We show that the problem is locally analytically well-posed in the space Hs(R+) for any s> -34 with the initial-value data (,)∈ Hs(R+)× Hs-1(R+) and the boundary-value data (h1,h2,h3) ∈ Hs+13(R+)× Hs-13(R+)× Hs-33(R+).