We show global uniqueness in an inverse problem for the fractional Schrödinger
equation: an unknown potential in a bounded domain is uniquely determined
by exterior measurements of solutions. We also show global uniqueness in
the partial data problem where measurements are taken in arbitrary open,
possibly disjoint, subsets of the exterior. The results apply in any dimension
and
are based on a strong approximation property of the fractional equation that extends
earlier work. This special feature of the nonlocal equation renders the analysis of
related inverse problems radically different from the traditional Calderón
problem.
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