On coupled-channel dynamics in the presence of anomalous thresholds

TL;DR

This paper develops a framework for analyzing coupled-channel systems with anomalous thresholds, enabling numerical solutions and physical interpretation through phase shifts and inelasticities.

Contribution

It introduces a novel method to handle anomalous thresholds in coupled-channel dynamics using deformed contour integrals and linear integral equations.

Findings

Framework successfully applied to a 3-channel system

Scattering amplitudes expressed via phase shifts and inelasticities

Method extends conventional approaches to complex energy planes

Abstract

We explore a general framework how to treat coupled-channel systems in the presence of overlapping left and right-hand cuts as well as anomalous thresholds. Such systems are studied in terms of a generalized potential, where we exploit the known analytic structure of t- and u-channel forces as the exchange masses get smaller approaching their physical values. Given an approximate generalized potential the coupled-channel reaction amplitudes are defined in terms of non-linear systems of integral equations. For large exchange masses, where there are no anomalous thresholds present, conventional $N/D$ methods are applicable to derive numerical solutions to the latter. At a formal level a generalization to the anomalous case is readily formulated by use of suitable contour integrations with amplitudes to be evaluated at complex energies. However, it is a considerable challenge to find numerical solutions to anomalous systems set up on a set of complex contours. By a suitable deformations of left-hand and right-hand cut lines we managed to establish a framework of linear integral equations defined for real energies. Explicit expressions are derived for the driving terms that hold for an arbitrary number of channels. Our approach is illustrated in terms of a schematic 3-channel systems. It is demonstrated that despite the presence of anomalous thresholds the scattering amplitude can be represented in terms of 3 phase shifts and 3 in-elasticity parameters, as one would expect from the coupled-channel unitarity condition.