A unified framework for photon and massive particle hypersurfaces in stationary spacetimes

Abstract

We revisit the notion of massive particle hypersurfaces and place it within a unified framework alongside photon hypersurfaces in stationary spacetimes. More precisely, for Killing-invariant timelike hypersurfaces T=R× S0, where S0 is a smooth embedded surface in a spacelike slice S of the stationary spacetime, we show that T is a photon hypersurface or a massive particle hypersurface if and only if S0 is totally geodesic with respect to certain associated Finsler structures on the slice: a Randers metric governing null geodesics and a Jacobi--Randers metric governing timelike solutions of the Lorentz force equation at fixed energy and charge-to-mass ratio. We also prove existence and multiplicity results for proper-time parametrized solutions of the Lorentz force equation with fixed energy and charge-to-mass ratio, either connecting a point to a flow line of the Killing vector field or having periodic, non-constant projection on S.