Pointwise convergence of sequential Schr\"odinger means
Abstract
We study pointwise convergence of the fractional Schr\"odinger means along sequences tn which converge to zero. Our main result is that bounds on the maximal function n |eitn(-)α/2 f| can be deduced from those on 0<t 1 |eit(-)α/2 f| when \tn\ is contained in the Lorentz space r,∞. Consequently, our results provide seemingly optimal results in higher dimensions, which extend the recent work of Dimou-Seeger, and Li-Wang-Yan to higher dimensions. Our approach based on a localization argument also works for other dispersive equations and provides alternative proofs of previous results on sequential convergence.
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