Well-Posedness for the Boussinesq-Type System Related to the Water Wave

This paper studies the initial value problem of Boussinesq-type system which describes the motion of water waves. We show the time local well-posedness in the weighted Sobolev space. This is the generalization of Angulo's work [1] from the view of regularity. Our argument is based on the contraction mapping principle for the integral equations after reducing our problem into the derivative nonlinear Schrodinger system. To overcome the regularity loss in the nonlinearity, we shall apply the smoothing effects of linear Schrodinger group due to Kenig-Ponce-Vega [7]. The gauge transform is also used to remove size restriction on the initial data.