Local smoothing estimates for Schr\"odinger equations in modulation spaces
Abstract
Motivated by a recent work of Schippa (2022), we consider local smoothing estimates for Schr\"odinger equations in modulation spaces. By using the C\'ordoba-Fefferman type reverse square function inequality and the bilinear Strichartz estimate, we can refine the summability exponent of modulation spaces. Next, we will also discuss a new type of randomized Strichartz estimate in modulation spaces. Finally, we will show that the reverse function estimate implies the Strichartz estimates in modulation spaces. From this implication, we obtain the reverse square function estimate of critical order.
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