A constructive approach to the Schröder equation

From the sole knowledge (at a finite number of points) of the numerical values of the potential V ( r ) corresponding to Schrodinger's radial equation, it is found that recourse to Information Theory (IT) concepts allows one to infer the pertinent wave functions (and eigenvalues) without attempting

We construct a general algorithm generating the analytic eigenfunctions as well as eigenvalues of one-dimensional stationary Schrödinger Hamiltonians. Both exact and quasi-exact Hamiltonians enter our formalism but we focus on quasi-exact interactions for which no such general approach has been cons

We obtain approximations to some bound-state solutions of Sohrikiinger equations with a variety of central potentials k'(r) without any direct csiculation of the matrix elements of V(r). The method involves solutions of two algebraic eigenvalue prob lems, one for a real tridiagonal matrix, and one f