Inverse source problem for discrete Helmholtz equation
Abstract
We consider multi-frequency inverse source problem for the discrete Helmholtz operator on the square lattice Zd, d 1. We consider this problem for the cases with and without phase information. We prove uniqueness results and present examples of non-uniqueness for this problem for the case of compactly supported source function, and a Lipshitz stability estimate for the phased case is established. Relations with inverse scattering problem for the discrete Schr\"odinger operators in the Born approximation are also provided.
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