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      On local well-posedness of nonlinear dispersive equations with partially regular data

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          Abstract

          We revisit the local well-posedness theory of nonlinear Schr\"odinger and wave equations in Sobolev spaces \(H^s\) and \(\dot{H}^s\), \(0< s\leq 1\). The theory has been well established over the past few decades under Sobolev initial data regular with respect to all spatial variables. But here, we reveal that the initial data do not need to have complete regularity like Sobolev spaces, but only partially regularity with respect to some variables is sufficient. To develop such a new theory, we suggest a refined Strichartz estimate which has a different norm for each spatial variable. This makes it possible to extract a different integrability/regularity of the data from each variable.

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          Journal
          03 November 2022
          Article
          2211.01672
          3a69114d-6bdd-4f61-a853-362de21ae262

          http://arxiv.org/licenses/nonexclusive-distrib/1.0/

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          15 pages
          math.AP

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