On The Local Well-Posedness for Some Systems of Coupled KdV Equations

Abstract

Using the theory developed by Kenig, Ponce, and Vega, we prove that the Hirota-Satsuma system is locally well-posed in Sobolev spaces Hs(R) × Hs(R) for 3/4<s1. We introduce some Bourgain-type spaces Xs,ba for a =0, s,b ∈ R to obtain local well-posedness for the Gear-Grimshaw system in Hs(R)× Hs(R) for s>-3/4, by establishing new mixed-bilinear estimates involving the two Bourgain-type spaces Xs,b-α- and Xs,b-α+ adapted to ∂t+α-∂x3 and ∂t+α+∂x3 respectively, where |α+|=|α-| = 0.