Abstract
In this paper we study the pointwise convergence problem along a tangential curve for the fractional Schrodinger equations in one spatial dimension and estimate the capacitary dimension of the divergence set. We extend a prior paper by Lee and the first author for the classical Schrodinger equation, which in itself contains a result due to Lee, Vargas and the first author, to the fractional Schrodinger equation. The proof is based on a decomposition argument without time localization, which has recently been introduced by the second author.
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