Endpoint Strichartz estimates with angular integrability and some applications
Abstract
The endpoint Strichartz estimate \|eit f\|Lt2 Lx∞ \|f\|L2 is known to be false in two space dimensions. Taking averages spherically on the polar coordinates x=ω, >0, ω∈S1, Tao showed a substitute of the form \|eit f\|Lt2L∞ Lω2 \|f\|L2. Here we address a weighted version of such spherically averaged estimates. As an application, the existence of solutions for the inhomogeneous nonlinear Schr\"odinger equation is shown for L2 data.
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