Unique determination of a magnetic Schr\"odinger operator with unbounded magnetic potential from boundary data

Abstract

We consider the Gel'fand-Calder\'on problem for a Schr\"odinger operator of the form -(∇ + iA)2 + q, defined on a ball B in R3. We assume that the magnetic potential A is small in Ws,3 for some s>0, and that the electric potential q is in W-1,3. We show that, under these assumptions, the magnetic field curl A and the potential q are both determined by the Dirichlet-Neumann relation at the boundary ∂ B. The assumption on q is critical with respect to homogeneity, and the assumption on A is nearly critical. Previous uniqueness theorems of this type have assumed either that both A and q are bounded or that A is zero.