Keel, Markus; Tao, Terence Endpoint Strichartz estimates. (English) Zbl 0922.35028 Am. J. Math. 120, No. 5, 955-980 (1998). Authors’ abstract: We prove an abstract Strichartz estimate, which implies previously unknown endpoint Strichartz estimates for the wave equation (in dimension \(n\geq 4)\) and the Schrödinger equation (in dimension \(n\geq 3\)). Three other applications are discussed: local existence for a nonlinear wave equation; and Strichartz-type estimates for more general dispersive equations and for the kinetic transport equation. Reviewer: V.Iftimie (Bucureşti) Cited in 5 ReviewsCited in 834 Documents MathOverflow Questions: How is interpolation used in the proof of Lemma 4.1 in Tao’s article Endpoint Strichartz Estimates? MSC: 35B45 A priori estimates in context of PDEs 35L70 Second-order nonlinear hyperbolic equations Keywords:Schrödinger equation; nonlinear wave equation; general dispersive equations; kinetic transport equation PDFBibTeX XMLCite \textit{M. Keel} and \textit{T. Tao}, Am. J. Math. 120, No. 5, 955--980 (1998; Zbl 0922.35028) Full Text: DOI Link