Numerical solution of the inverse spectral problem for Bessel operators (Q711235)

The authors deal with some inverse spectral problems for the Bessel operator \(L\) in the singular case, where \(L\) is defined \(L u=-u^{\prime \prime }+\left( q(x)+\frac{l(l+1)}{x^{2}}\right) u,\) with \( l=1,2,\dots\). The paper follows the approach to transform the singular problem to some corresponding regular problem and then exploits one of the well developed methods for that case. A detailed computational method is provided together with discussions about some significant numerical examples. Two valuable Appendices enrich the content.