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A class of solitons in Maxwell-scalar and Einstein–Maxwell-scalar models

Carlos A. R. Herdeiro, João M. S. Oliveira, Eugen Radu

2020The European Physical Journal C27 citationsDOIOpen Access PDF

Abstract

Abstract Recently, no-go theorems for the existence of solitonic solutions in Einstein–Maxwell-scalar (EMS) models have been established (Herdeiro and Oliveira in Class Quantum Gravity 36(10):105015, 2019). Here we discuss how these theorems can be circumvented by a specific class of non-minimal coupling functions between a real, canonical scalar field and the electromagnetic field. When the non-minimal coupling function diverges in a specific way near the location of a point charge, it regularises all physical quantities yielding an everywhere regular, localised lump of energy. Such solutions are possible even in flat spacetime Maxwell-scalar models, wherein the model is fully integrable in the spherical sector, and exact solutions can be obtained, yielding an explicit mechanism to de-singularise the Coulomb field. Considering their gravitational backreaction, the corresponding (numerical) EMS solitons provide a simple example of self-gravitating, localised energy lumps.

Topics & Concepts

PhysicsIntegrable systemClass (philosophy)Classical mechanicsCoupling (piping)Scalar fieldGravitational fieldSpacetimeQuantumMathematical physicsGravitationElectromagnetic fieldScalar (mathematics)CoulombPoint (geometry)Minimal couplingSimple (philosophy)Theoretical physicsQuantum field theoryField (mathematics)General relativityMathematicsQuantum mechanicsFunction (biology)SolitonQuantum gravityTerm (time)Mathematical analysisExact solutions in general relativityCosmology and Gravitation TheoriesPulsars and Gravitational Waves ResearchAdvanced Mathematical Physics Problems
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