The two-nucleon electromagnetic charge operator in chiral effective field theory () up to one loop

Abstract

The electromagnetic charge operator in a two-nucleon system is derived in chiral effective field theory () up to order e\, Q (or N4LO), where Q denotes the low-momentum scale and e is the electric charge. The specific form of the N3LO and N4LO corrections from, respectively, one-pion-exchange and two-pion-exchange depends on the off-the-energy-shell prescriptions adopted for the non-static terms in the corresponding potentials. We show that different prescriptions lead to unitarily equivalent potentials and accompanying charge operators. Thus, provided a consistent set is adopted, predictions for physical observables will remain unaffected by the non-uniqueness associated with these off-the-energy-shell effects.