On the space-time curvature experienced by quasiparticle excitations in the Painlevé–Gullstrand effective geometry

Abstract

We consider quasiparticle propagation in constant-speed-of-sound (iso-tachic) and almost incompressible (iso-pycnal) hydrodynamic flows, using the technical machinery of general relativity to investigate the “effective space-time geometry” that is probed by the quasiparticles. This effective geometry, described for the quasiparticles of condensed matter systems by the Painlevé–Gullstrand metric, generally exhibits curvature (in the sense of Riemann) and many features of quasiparticle propagation can be re-phrased in terms of null geodesics, Killing vectors, and Jacobi fields. As particular examples of hydrodynamic flow we consider shear flow, a constant-circulation vortex, flow past an impenetrable cylinder, and rigid rotation.