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Derivative corrections to the Heisenberg-Euler effective action

Felix Karbstein

2021Journal of High Energy Physics15 citationsDOIOpen Access PDF

Abstract

A bstract We show that the leading derivative corrections to the Heisenberg-Euler effective action can be determined efficiently from the vacuum polarization tensor evaluated in a homogeneous constant background field. After deriving the explicit parameter-integral representation for the leading derivative corrections in generic electromagnetic fields at one loop, we specialize to the cases of magnetic- and electric-like field configurations characterized by the vanishing of one of the secular invariants of the electromagnetic field. In these cases, closed-form results and the associated all-orders weak- and strong-field expansions can be worked out. One immediate application is the leading derivative correction to the renowned Schwinger-formula describing the decay of the quantum vacuum via electron-positron pair production in slowly-varying electric fields.

Topics & Concepts

PhysicsEffective actionElectromagnetic fieldVacuum polarizationAction (physics)Derivative (finance)Quantum electrodynamicsTime derivativeTensor (intrinsic definition)Electric fieldHomogeneousQuantumMathematical physicsRepresentation (politics)Quantum field theoryQuantum mechanicsField (mathematics)Theoretical physicsSecond derivativePolarization (electrochemistry)Functional derivativeCovariant derivativeGeneralizations of the derivativePair productionConstant (computer programming)Classical mechanicsVacuum stateGravitationLimit (mathematics)QED vacuumGauge covariant derivativeQuantum and Classical ElectrodynamicsCosmology and Gravitation TheoriesAtomic and Molecular Physics