Channel-localized Strichartz estimates of radial wave equations
Abstract
In this work we give a few new Strichartz estimates of radial solutions to the wave equation. These Strichartz estimates still use Lp Lq type norms in each channel-like region \(x,t): |t|+2k < |x| < |t|+2k+1\, with weaker restrictions on p, q than the classic ones, but combine these localized norms together in the way of an l2 space. We also give an application of these Strichartz estimates on the well-posedness theory of non-linear wave equations.
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