An essential singularity of the cotangent of the Coulomb-nuclear phase shift, and a finite limit of the nuclear part of the effective-range function derived at zero energy

Abstract

The Coulomb-nuclear phase shift δ(cs)l, δ(cs)l and a finite limit of the nuclear part l(k) of the effective-range function (ERF) are derived for an arbitrary orbital momentum l when energy E→0. It is proved that δ(cs)l has an essential singularity at zero energy, but l(k) does not. The explicit finite limit of l(0) is found. The property of l(k) as a meromorphic function makes possible the analytical continuation of a re-normalized scattering amplitude from the physical energy region to a bound state pole. Then the asymptotic normalization coefficients (ANC) can be deduced from experimental phase-shift data and applied to radiative capture processes which are important in nuclear astrophysics for new elements creation. Our results are in agreement with the results published for S wave scattering.