Litcius/Paper detail

Revisiting relativistic magnetohydrodynamics from quantum electrodynamics

Masaru Hongo, Koichi Hattori

2021Journal of High Energy Physics14 citationsDOIOpen Access PDF

Abstract

A bstract We provide a statistical mechanical derivation of relativistic magnetohydrodynamics on the basis of (3 + 1)-dimensional quantum electrodynamics; the system endowed with a magnetic one-form symmetry. The conservation laws and constitutive relations are presented in a manifestly covariant way with respect to the general coordinate transformation. The method of the local Gibbs ensemble (or nonequilibrium statistical operator) combined with the path-integral formula for a thermodynamic functional enables us to obtain exact forms of constitutive relations. Applying the derivative expansion to exact formulas, we derive the first-order constitutive relations for nonlinear relativistic magnetohydrodynamics. Our results for the QED plasma preserving parity and charge-conjugation symmetries are equipped with two electrical resistivities and five (three bulk and two shear) viscosities. We also show that those transport coefficients satisfy the Onsager’s reciprocal relation and a set of inequalities, indicating semi-positivity of the entropy production rate consistent with the local second law of thermodynamics.

Topics & Concepts

PhysicsCovariant transformationEntropy (arrow of time)Conservation lawEntropy productionNon-equilibrium thermodynamicsClassical mechanicsNonlinear systemQuantumConstitutive equationMathematical physicsQuantum mechanicsBasis (linear algebra)Time derivativeParity (physics)Massless particleQuantum electrodynamicsHomogeneous spaceSecond law of thermodynamicsGeneral relativityMagnetohydrodynamicsExact solutions in general relativityCanonical ensembleRelativistic particleFermionMaxwell relationsStatistical ensembleLattice (music)Theoretical physicsStatistical mechanicsLorentz transformationQuantum field theoryStatistical physicsTime evolutionLagrangian and Eulerian specification of the flow fieldQuantum fluctuationDust and Plasma Wave PhenomenaThermoelastic and Magnetoelastic PhenomenaStatistical Mechanics and Entropy