Trigonometric quark confinement potential of QCD traits

TL;DR

This paper proposes that the trigonometric Rosen-Morse potential accurately models quark confinement in QCD, providing analytic solutions for nucleon properties and showing good agreement with experimental data.

Contribution

It introduces the trigonometric Rosen-Morse potential as an exactly solvable model for quark confinement, bridging Coulomb and infinite well potentials, with analytic expressions for nucleon spectra and form factors.

Findings

Good agreement with nucleon mass spectrum data

Analytic expressions for proton electric form factor

Closed-form effective gluon propagator

Abstract

We make the case that the Coulomb- plus linear quark confinement potential predicted by lattice QCD is an approximation to the exactly solvable trigonometric Rosen-Morse potential that has the property to interpolate between the Coulomb- and the infinite wells. We test the predictive power of this potential in the description of the nucleon (considered as a quark-diquark system) and provide analytic expressions for its mass spectrum and the proton electric form factor. We compare the results obtained in this fashion to data and find quite good agreement. We obtain an effective gluon propagator in closed form as the Fourier transform of the potential under investigation.