Low regularity solutions of two fifth-order KdV type equations

Abstract

The Kawahara and modified Kawahara equations are fifth-order KdV type equations and have been derived to model many physical phenomena such as gravity-capillary waves and magneto-sound propagation in plasmas. This paper establishes the local well-posedness of the initial-value problem for Kawahara equation in Hs( R) with s>-74 and the local well-posedness for the modified Kawahara equation in Hs( R) with s-14. To prove these results, we derive a fundamental estimate on dyadic blocks for the Kawahara equation through the [k; Z] multiplier norm method of Tao Tao2001 and use this to obtain new bilinear and trilinear estimates in suitable Bourgain spaces.