Evaluation of analytic functions by generalized digital integration

Indefinite integrals of products of Coulomb wave functions over the interval (r, oc) can be evaluated by conversion to continued fractions. Examples are given of normalization and dipole transition integrals required in photoionization calculations.

A product integral solution of the abstract evolution equation u'(t) = Hi(t) u(t) is obtained in the event that H~(t) belongs to a class of generahzed operator-valued functions involving singular perturbations in the interaction representation (H1(t) = ie -imo Ve,No, where Ho is a power of ( -d )1/2

Using the generalized hypergeometric function, we study a class Φ p k (q, s; A, B, λ) of analytic functions with negative coefficients. Coefficient estimates, distortion theorem, extreme points and the radii of close-to-convexity and convexity for this class are given. We also derive many results fo