Electromagnetic Splittings and Light Quark Masses in Lattice QCD

Abstract: A method for computing electromagnetic properties of hadrons in lattice QCD is described and preliminary numerical results are presented. The electromagnetic field is introduced dynamically, using a noncompact formulation. Employing enhanced electric charges, the dependence of the pseudoscalar meson mass on the (anti)quark charges and masses can be accurately calculated. At $\beta=5.7$ with Wilson action, the $\pi^+-\pi^0$ splitting is found to be $4.9(3)$ MeV. Using the measured $K^0-K^+$ splitting, we also f… Show more

“…The issues complicating the inclusion of QED in FV calculations with PBCs are well known, the most glaring of which is the inability to preserve Gauss's law [6,15,16], which relates the electric flux penetrating any closed surface to the charge enclosed by the surface, and Ampere's Law, which relates the integral of the magnetic field around a closed loop to the current penetrating the loop. An obvious way to see the problem is to consider the electric field along the axes of the cubic volume (particularly at the surface) associated with a point charge at the center.…”

“…While naively appearing to be a simple extension of pure LQCD calculations, there are subtleties associated with including QED. In particular, Gauss's law and Ampere's law cannot be satisfied when the electromagnetic gauge field is subject to periodic boundary conditions (PBCs) [14][15][16]. However, a uniform background charge density can be introduced to circumvent this problem and restore these laws.…”

Finite-volume electromagnetic corrections to the masses of mesons, baryons, and nuclei

“…The issues complicating the inclusion of QED in FV calculations with PBCs are well known, the most glaring of which is the inability to preserve Gauss's law [6,15,16], which relates the electric flux penetrating any closed surface to the charge enclosed by the surface, and Ampere's Law, which relates the integral of the magnetic field around a closed loop to the current penetrating the loop. An obvious way to see the problem is to consider the electric field along the axes of the cubic volume (particularly at the surface) associated with a point charge at the center.…”

“…While naively appearing to be a simple extension of pure LQCD calculations, there are subtleties associated with including QED. In particular, Gauss's law and Ampere's law cannot be satisfied when the electromagnetic gauge field is subject to periodic boundary conditions (PBCs) [14][15][16]. However, a uniform background charge density can be introduced to circumvent this problem and restore these laws.…”

Finite-volume electromagnetic corrections to the masses of mesons, baryons, and nuclei

“…In the absence of QED, hadron self energies contain FV corrections that are exponentially suppressed by the dimensionless parameter m π L, and therefore, neglecting these corrections, the kinematics in the FV are the same as in the continuum. This is no longer the case in the presence of QED as the hadron masses have power-law volume dependencies [42][43][44][45].…”

“…In particular, Ampere's law and Gauss's law cannot be satisfied with a QED gauge field subject to periodic boundary conditions (PBCs) [42][43][44][45]. A uniform background charge density can be introduced to circumvent this problem, a procedure which is equivalent to removing the zero modes of the photon.…”

Two-particle elastic scattering in a finite volume including QED

“…[1] where the first lattice calculation of the electromagnetic mass splitting of nucleons and light pseudoscalar mesons has been attempted. The proposed solution consists in quenching a particular set of Fourier modes of the gauge field, in such a way that the global zero-modes decouple from the dynamics.…”

Charged hadrons in local finite-volume QED+QCD with C⋆ boundary conditions