Well-posedness for the Non-integrable Periodic Fifth Order KdV in Bourgain Spaces

Abstract

We study well-posedness for a non-integrable generalization of the fifth order KdV, the second member in the KdV heirarchy. In particular, we use differentiation-by-parts to establish well-posedness for s> 35/64 in low modulation restricted norm spaces, as well as non-linear smoothing of order < (2(s-35/64), 1). As corollaries, we obtain unconditional well-posedness for the non-integrable fifth order KdV for s > 1 and global well-posedness for the integrable fifth order KdV for s≥ 1. We also show local well-posedness for the non-integrable fifth order KdV for s > 1/2, contingent upon the conjectured L8 Strichartz estimate. As an application of the nonlinear smoothing we obtain non-trivial upper bounds on the upper Minkowski dimension of the solution to the non-integrable fifth order KdV.