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Duality-invariant nonlinear electrodynamics and stress tensor flows

Christian Ferko, Sergei M. Kuzenko, Liam Smith, Gabriele Tartaglino‐Mazzucchelli

2023Physical review. D/Physical review. D.40 citationsDOIOpen Access PDF

Abstract

Given a model for self-dual nonlinear electrodynamics in four spacetime dimensions, any deformation of this theory which is constructed from the duality-invariant energy-momentum tensor preserves duality invariance. In this work we present new proofs of this known result and also establish a previously unknown converse: any parametrized family of duality-invariant Lagrangians, all constructed from an Abelian field strength ${F}_{\ensuremath{\mu}\ensuremath{\nu}}$ but not its derivatives, is related by a generalized stress tensor flow, in a sense which we make precise. We establish this and other properties of stress tensor deformations of theories of nonlinear electrodynamics using both a conventional Lagrangian representation and using two auxiliary field formulations. We analyze these flows in several examples of duality-invariant models including the Born-Infeld and ModMax theories, and we derive a new auxiliary field representation for the two-parameter family of ModMax-Born-Infeld theories. These results suggest that the space of duality-invariant theories may be characterized as a subspace of theories of electrodynamics with the property that all tangent vectors to this subspace are operators constructed from the stress tensor.

Topics & Concepts

PhysicsInvariant (physics)Tensor fieldMathematical physicsCauchy stress tensorDuality (order theory)Tensor (intrinsic definition)Nonlinear systemBorn–Infeld modelSymmetric tensorSpacetimeClassical mechanicsMathematicsPure mathematicsQuantum mechanicsExact solutions in general relativityAction (physics)Black Holes and Theoretical PhysicsQuantum Electrodynamics and Casimir EffectCosmology and Gravitation Theories
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