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Geometrized quantum Galileons

Lavinia Heisenberg, Christian F. Steinwachs

2020Journal of Cosmology and Astroparticle Physics14 citationsDOIOpen Access PDF

Abstract

We investigate the renormalization structure of the scalar Galileon model in flat spacetime by calculating the one-loop divergences in a closed geometric form. The geometric formulation is based on the definition of an effective Galileon metric and allows to apply known heat-kernel techniques. The result for the one-loop divergences is compactly expressed in terms of curvature invariants of the effective Galileon metric and corresponds to a resummation of the divergent one-loop contributions of all n-point functions. The divergent part of the one-loop effective action therefore serves as generating functional for arbitrary n-point counterterms. We discuss our result within the Galileon effective field theory and give a brief outlook on extensions to more general Galileon models in curved spacetime.

Topics & Concepts

PhysicsResummationTheoretical physicsMetric (unit)SpacetimeRenormalizationEffective actionScalar (mathematics)Action (physics)Field (mathematics)Quantum field theoryClassical mechanicsGravitationScalar fieldSpace timeQuantumQuantum gravitySpace (punctuation)Warp driveExtra dimensionsEffective field theoryStatistical physicsInstantonCurved spaceQuantum field theory in curved spacetimeField theory (psychology)Renormalization groupScalar field theoryMathematical physicsGeneral relativityAsymptotic safety in quantum gravityQuantum fluctuationBorn–Infeld modelFormalism (music)Critical phenomenaNoncommutative and Quantum Gravity TheoriesBlack Holes and Theoretical PhysicsQuantum Electrodynamics and Casimir Effect
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