Reconstruction of the potential from I-function

Abstract

If f(x,k) is the Jost solution and f(x) = f(0,k), then the I-function is I(k) := f(0,k)f(k). It is proved that I(k) is in one-to-one correspondence with the scattering triple S :=\S(k), kj, sj, 1 ≤ j ≤ J\ and with the spectral function (λ) of the Sturm-Liouville operator l= -d2dx2 + q(x) on (0, ∞) with the Dirichlet condition at x=0 and q(x) ∈ L1,1 := \q: q= q, ∫∞0 (1+x) |q(x) dx < ∞\. Analytical methods are given for finding S from I(k) and I(k) from S, and (λ) from I(k) and I(k) from (λ). Since the methods for finding q(x) from S or from (λ) are known, this yields the methods for finding q(x) from I(k).

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