Inverse resonance scattering for Jacobi operators
Abstract
We consider the Jacobi operator (Jf)n= an-1fn-1+anfn+1+bnfn on with a real compactly supported sequences (an-1)n∈ and (bn)n∈. We give the solution of two inverse problems (including characterization): (a,b) \zeros of the reflection coefficient\ and (a,b) \bound states and resonances\. We describe the set of "iso-resonance operators J", i.e., all operators J with the same resonances and bound states.
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