Anomalies in fluid dynamics: flows in a chiral background via variational principle

TL;DR

This paper explores how external electromagnetic and axial-vector fields influence fluid flows, revealing deformations in the Euler equation and currents, and connecting fluid dynamics with quantum field theory anomalies through an extended variational principle.

Contribution

It introduces a novel variational approach to incorporate axial-vector potentials into fluid dynamics, linking classical flows with quantum anomalies.

Findings

Deformation of Euler equation by axial-vector potential

Currents are modified by external fields

Divergence of currents linked to chiral anomaly

Abstract

We study flows of barotropic perfect fluid under the simultaneous action of the electromagnetic field and the axial-vector potential, the external field conjugate to the fluid helicity. We obtain the deformation of the Euler equation by the axial-vector potential and the deformations of various currents by two external fields. We show that the divergence of the vector and axial currents are controlled by the chiral anomaly known in quantum field theories with Dirac fermions. We obtain these results by extending the variational principle for barotropic flows of a perfect fluid by coupling with the external axial-vector potential.