On the constructive solution of an inverse Sturm-Liouville problem

Abstract: The necessary and sufficient conditions are found for the two sequences $\left{\mu_n \right}{n=0}^{\infty}$ and $\left{a_n \right}{n=0}^{\infty}$ to be the spectrum and the norming constants respectively, for a boundary value problem $-y'' + q \left( x \right) y = \mu y,$ $y \left(0\right)=0,$ $y\left( \pi \right)\cos \beta + y'\left( \pi \right)\sin \beta = 0,$ $\beta \in \left( 0, \pi \right),$ with $q \in L_{\mathbb{R}}^1 \left[0, \pi \right].$