Uniform bounds, zero separation and monotonicity for the regular Coulomb wave functions

Abstract

This paper begins by deriving the uniform bounds for the regular Coulomb wave function F,η and its derivative F,η'. We then examine detailed zero configurations of F,η and F+1,η, extending insights into the earlier work that was restricted to >-3/2. Our investigation also includes an analysis of the monotonicity of the zeros of F,η with respect to parameters and η, respectively. Furthermore, we expand our exploration to associated orthogonal polynomials, as well as the functions involving both F,η and F,η'. Finally, we explore the breakdown of the Sturm separation theorem by means of the zeros of associated orthogonal polynomials.