6533b7cefe1ef96bd12571ea
RESEARCH PRODUCT
Electromagnetic moments of quasi-stable particle
Vladimir PascalutsaTim LedwigMarc Vanderhaeghensubject
Electromagnetic fieldPhysicsNuclear and High Energy PhysicsField (physics)Magnetic energyMagnetic momentNuclear TheoryHigh Energy Physics - Lattice (hep-lat)FOS: Physical sciencesOptical fieldMagnetic fieldNuclear Theory (nucl-th)Particle decayMagnetizationHigh Energy Physics - PhenomenologyHigh Energy Physics - Phenomenology (hep-ph)High Energy Physics - LatticeQuantum electrodynamicsQuantum mechanicsdescription
We deal with the problem of assigning electromagnetic moments to a quasi-stable particle (i.e., a particle with mass located at particle's decay threshold). In this case, an application of a small external electromagnetic field changes the energy in a non-analytic way, which makes it difficult to assign definitive moments. On the example of a spin-1/2 field with mass $M_{*}$ interacting with two fields of masses $M$ and $m$, we show how a conventionally defined magnetic dipole moment diverges at $M_{*}=M+m$. We then show that the conventional definition makes sense only when the values of the applied magnetic field $B$ satisfy $|eB|/2M_{*}\ll|M_{*}-M-m|$. We discuss implications of these results to existing studies in electroweak theory, chiral effective-field theory, and lattice QCD.
| year | journal | country | edition | language |
|---|---|---|---|---|
| 2010-04-28 |