On a higher dimensional version of the Benjamin--Ono equation

Abstract: We consider a higher dimensional version of the Benjamin--Ono equation, $\partial_t u -\mathcal{R}1\Delta u+u\partial{x_1} u=0$, where $\mathcal{R}_1$ denotes the Riesz transform with respect to the first coordinate. We first establish sharp space--time estimates for the associated linear equation. These estimates enable us to show that the initial value problem for the nonlinear equation is locally well-posed in $L^2$-Sobolev spaces $H^{s}(\mathbb{R}^d)$, with $s>5/3$ if $d=2$ and $s>d/2+1/2$ if $d\ge 3$. We also provide ill-posedness results.