Random data Cauchy problem for a generalized KdV equation in the supercritical case

Abstract

We consider the Cauchy problem for a generalized KdV equation eqnarray* ut+∂x3u+u7ux=0, eqnarray* with random data on . Kenig, Ponce, Vega(Comm. Pure Appl. Math.46(1993), 527-620)proved that the problem is globally well-posed in Hs()$ with s> scrit=314, which is the scaling critical regularity indices. Birnir, Kenig, Ponce, Svanstedt, Vega(J. London Math. Soc. 53 (1996), 551-559.) proved that the problem is ill-posed in the sense that the time of existence T and the continuous dependence cannot be expressed in terms of the size of the data in the H314-norm. In this present paper, we prove that almost sure local in time well-posedness holds in Hs() with s>17112, whose lower bound is below 314. The key ingredients are the Wiener randomization of the initial data and probabilistic Strichartz estimates together with some important embedding Theorems.