Inverse Problem for the Schr\"odinger Operator in an Unbounded Strip
Abstract
We consider the operator H:= i ∂t + ∇ · (c ∇) in an unbounded strip in R2, where c(x,y) ∈ C3(). We prove adapted a global Carleman estimate and an energy estimate for this operator. Using these estimates, we give a stability result for the diffusion coefficient c(x,y).
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