Well-posedness for KdV-type equations with quadratic nonlinearity

Abstract

We consider the Cauchy problem of the KdV-type equation \[ ∂t u + 13 ∂x3 u = c1 u ∂x2u + c2 (∂x u)2, u(0)=u0. \] Pilod (2008) showed that the flow map of this Cauchy problem fails to be twice differentiable in the Sobolev space Hs(R) for any s ∈ R if c1 ≠ 0. By using a gauge transformation, we point out that the contraction mapping theorem is applicable to the Cauchy problem if the initial data are in H2(R) with bounded primitives. Moreover, we prove that the Cauchy problem is locally well-posed in H1(R) with bounded primitives.