Paper detail

Improved Strichartz estimates for a class of dispersive equations in the radial case and their applications to nonlinear Schrödinger and wave equation

We prove some new Strichartz estimates for a class of dispersive equations with radial initial data. In particular, we obtain up to some endpoints the full radial Strichartz estimates for the Schrödinger equation. The ideas of proof are based on Shao's ideas \cite{Shao} and some ideas in \cite{GPW} to treat the non-homogeneous case, while at the endpoint we need to use subtle tools to overcome some logarithmic divergence. We also apply the improved Strichartz estimates to the nonlinear problems. First, we prove the small data scattering and large data LWP for the nonlinear Schrödinger equation with radial critical $\dot{H}^s$ initial data below $L^2$; Second, for radial data we improve the results of the $\dot{H}^s\times \dot{H}^{s-1}$ well-posedness for the nonlinear wave equation in \cite{SmithSogge}; Finally, we obtain the well-posedness theory for the fractional order Schrödinger equation in the radial case.