M. Bawin, S. A. Coon
Published 1999-06-05Version 1
We consider the Dirac equation for a finite-size neutron in an external electric field. We explicitly incorporate Dirac-Pauli form factors into the Dirac equation. After a non-relativistic reduction, the Darwin-Foldy term is cancelled by a contribution from the Dirac form factor, so that the only coefficient of the external field charge density is $e/6 r^2_{En}$, i. e. the root mean square radius associated with the electric Sachs form factor . Our result is similar to a recent result of Isgur, and reconciles two apparently conflicting viewpoints about the use of the Dirac equation for the description of nucleons.
Comments: 7 pages, no figures, to appear in Physical Review C
Journal: Phys.Rev. C60 (1999) 025207
Approximate Spin and Pseudospin Solutions of the Dirac equation with Rosen-Morse Potential including a Coulomb Tensor Interaction
The mean square radius of the neutron distribution and the skin thickness derived from electron scattering
Supersymmetric structure in the Dirac equation with cylindrically-deformed potentials
