A uniqueness result for one-dimensional inverse scattering (Q2892945)

The authors study the whole-line inverse scattering for Sturm-Liouville equations with constant coefficients on a half-line. They recall a formula connecting the reflection coefficient and the Dirichlet \(m\)-coefficient. Using this formula, one obtains new results in the one-dimensional scattering theory for left- and right-definite problems from similar results in inverse spectral theory. The gain is that less smoothness and less decay of the data is required.