Light-ring pairs from A-discriminantal varieties

Abstract

When geodesic equations are formulated in terms of an effective potential U, circular orbits are characterised by U=∂a U=0. In this paper we consider the case where U is an algebraic function. Then the condition for circular orbits defines an A-discriminantal variety. A theorem by Rojas and Rusek, suitably interpreted in the context of effective potentials, gives a precise criteria for certain types of spacetimes to contain at most two branches of light rings (null circular orbits), where one is stable and the other one unstable. We identify a few classes of static, spherically-symmetric spacetimes for which these two branches occur and show that the spacetimes with non-degenerate horizons do not have stable light rings.