Entanglement entropy of the proton in coordinate space

Abstract

We calculate the entanglement entropy of a model proton wave function in coordinate space by integrating out degrees of freedom outside a small circular region A of radius L, where L is much smaller than the size of the proton. The wave function provides a nonperturbative distribution of three valence quarks. In addition, we include the perturbative emission of a single gluon and calculate the entanglement entropy of gluons in A. For both, quarks and gluons we obtain the same simple result: SE =-∫dx x\, NL2(x)[Na2(x)], where a is the UV cutoff in coordinate space and x is the longitudinal resolution scale. Here NS(x) is the number of partons (of the appropriate species) with longitudinal momentum fraction x inside an area S. It is related to the standard parton distribution function (PDF) by NS(x)=SAp\, x\, F(x), where Ap denotes the transverse area of the proton.