An inverse problem for the relativistic Schr\"odinger equation with partial boundary data
Abstract
We study the inverse problem of determining the vector and scalar potentials A(t,x)=(A0,A1,·s,An) and q(t,x), respectively, in the relativistic Schr\"odinger equation equation* ((∂t+A0(t,x))2-Σj=1n(∂j+Aj(t,x))2+q(t,x))u(t,x)=0 equation* in the region Q=(0,T)×, where is a C2 bounded domain in Rn for n≥ 3 and T>diam() from partial data on the boundary ∂ Q. We prove the unique determination of these potentials modulo a natural gauge invariance for the vector field term.
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