A global space-time estimate for dispersive operators through its local estimate
Abstract
We will show that a local space-time estimate implies a global space-time estimate for dispersive operators. In order for this implication we consider a Littlewood-Paley type square function estimate for dispersive operators in a time variable and a generalization of Tao's epsilon removal lemma in mixed norms. By applying this implication to the fractional Schrodinger equation in R2+1 we obtain the sharp global space-time estimates with optimal regularity from the previous known local ones.
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