Jost functions and Jost solutions for Jacobi matrices, III. Asymptotic series for decay and meromorphicity
Abstract
We show that the parameters an, bn of a Jacobi matrix have a complete asymptotic series an2 -1 &= Σk=1K(R) pk(n) μk-2n + O(R-2n) bn &= Σk=1K(R) pk(n) μk-2n+1 + O(R-2n) where 1 < |μj| < R for j≤ K(R) and all R if and only if the Jost function, u, written in terms of z (where E=z+z-1) is an entire meromorphic function. We relate the poles of u to the μj's.
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