On the connection betweenS-matrix and the Neumann series expansion of the wave function

The Neumann series representation for the Bessel functions and Neumann functions is generalized for the regular and irregular solutions of the Kummer equation. This representation results in a convenient algorithm for the computation of a large family of special functions, e.g., most of the soluble

The problem of the computation of the matrix elements Z ( v , v ' ; k ) = [ q U ( r ) ( r -rJkqUr(r)dr, is considered when q u ( r ) and q J r ) are eigenfunctions related to a diatomic potential of the RKR type (defined by the coordinates of its turning points Pi with polynomial interpolations). Th

The R. x n generalized Pascal matrix P(t) whose elements are related to the hypergeometric function zFr(a, b; c; Z) is presented and the Cholesky decomposition of P(t) is obtained.