Dual parametrization of generalized parton distributions in two equivalent representations

TL;DR

This paper demonstrates the equivalence of dual parametrization and Mellin-Barnes integral approaches for generalized parton distributions, clarifies related concepts, and provides methods for GPD modeling and reparametrization.

Contribution

It explicitly proves the equivalence of two GPD representations and introduces a reparametrization procedure linking double distributions to Mellin-Barnes integrals.

Findings

Proved the equivalence of dual parametrization and Mellin-Barnes integral approaches.

Clarified the concepts of the $J=0$ fixed pole and the $D$-form factor.

Mapped the Kumerički-Müller GPD model into the dual parametrization framework.

Abstract

The dual parametrization and the Mellin-Barnes integral approach represent two frameworks for handling the double partial wave expansion of generalized parton distributions (GPDs) in the conformal partial waves and in the $t$-channel ${\rm SO}(3)$ partial waves. Within the dual parametrization framework, GPDs are represented as integral convolutions of forward-like functions whose Mellin moments generate the conformal moments of GPDs. The Mellin-Barnes integral approach is based on the analytic continuation of the GPD conformal moments to the complex values of the conformal spin. GPDs are then represented as the Mellin-Barnes-type integrals in the complex conformal spin plane. In this paper we explicitly show the equivalence of these two independently developed GPD representations. Furthermore, we clarify the notions of the $J=0$ fixed pole and the $D$-form factor. We also provide some insight into GPD modeling and map the phenomenologically successful Kumeri\v{c}ki-M\"uller GPD model to the dual parametrization framework by presenting the set of the corresponding forward-like functions. We also build up the reparametrization procedure allowing to recast the double distribution representation of GPDs in the Mellin-Barnes integral framework and present the explicit formula for mapping double distributions into the space of double partial wave amplitudes with complex conformal spin.