Well-posedness for the fifth order KdV equation

Abstract: In this paper, we establish the well-posedness for the Cauchy problem of the fifth order KdV equation with low regularity data. The nonlinear term has more derivatives than can be recovered by the smoothing effect, which implies that the iteration argument is not available when initial data is given in $H^s$ for any $s \in \mathbb{R}$. So we give initial data in $H^{s,a}=H^s \cap \dot{H}^a$ when $a \leq s$ and $a \leq 0$. Then we can use the Fourier restriction norm method to obtain the local well-posedness in $H^{s,a}$ when $s \geq \max{-1/4, -2a-2 }$, $-3/2<a \leq -1/4$ and $(s,a) \neq (-1/4,-7/8)$. This result is optimal in some sense.