6533b82dfe1ef96bd1291632
RESEARCH PRODUCT
Dispersion Interactions between Neutral Atoms and the Quantum Electrodynamical Vacuum
Roberto Passantesubject
Electromagnetic fieldHigh Energy Physics - TheoryPhysics and Astronomy (miscellaneous)Field (physics)General MathematicsVan der Waals forceFOS: Physical sciencesVirtual particleCasimir-Polder interactionGeneral Relativity and Quantum Cosmology (gr-qc)01 natural sciencesGeneral Relativity and Quantum Cosmologyvacuum energyCasimir–Polder interactionssymbols.namesakeMany-body dispersion interactionVacuum energyQuantum mechanics0103 physical sciencesDispersion (optics)Computer Science (miscellaneous)Vacuum fluctuation010306 general physicsvacuum fluctuationsQuantum fluctuationPhysicsQuantum Physics010308 nuclear & particles physicslcsh:Mathematicsmany-body dispersion interactionslcsh:QA1-939Unruh effectHigh Energy Physics - Theory (hep-th)Chemistry (miscellaneous)symbolsvan der Waals forcesvan der Waals forceQuantum Physics (quant-ph)description
Dispersion interactions are long-range interactions between neutral ground-state atoms or molecules, or polarizable bodies in general, due to their common interaction with the quantum electromagnetic field. They arise from the exchange of virtual photons between the atoms, and, in the case of three or more atoms, are not additive. In this review, after having introduced the relevant coupling schemes and effective Hamiltonians, as well as properties of the vacuum fluctuations, we~outline the main properties of dispersion interactions, both in the nonretarded (van der Waals) and retarded (Casimir--Polder) regime. We then discuss their deep relation with the existence of the vacuum fluctuations of the electromagnetic field and vacuum energy. We describe some transparent physical models of two- and three-body dispersion interactions, based on dressed vacuum field energy densities and spatial field correlations, which stress their deep connection with vacuum fluctuations and vacuum energy. These models give a clear insight of the physical origin of dispersion interactions, and also provide useful computational tools for their evaluation. We show that this aspect is particularly relevant in more complicated situations, for example when macroscopic boundaries are present. We also review recent results on dispersion interactions for atoms moving with noninertial motions and the strict relation with the Unruh effect, and on resonance interactions between entangled identical atoms in uniformly accelerated motion.
| year | journal | country | edition | language |
|---|---|---|---|---|
| 2018-01-01 |