Gravitational lensing in the Simpson-Visser black-bounce spacetime in a strong deflection limit

Abstract

A Simpson-Visser spacetime has two nonnegative parameters a and m and its metric is correspond with (i) a Schwarzschild metric for a=0 and m≠0, (ii) a regular black hole metric for a<2m, (iii) a one-way traversable wormhole metric for a=2m, (vi) a two-way traversable wormhole metric for a>2m, and (v) an Ellis-Bronnikov wormhole metric for a≠0 and m=0. The spacetime is one of the most useful spacetimes for the purpose of comprehensively understanding gravitational lensing of light rays reflected by a photon sphere of black holes and wormholes. We have investigated gravitational lensing in the Simpson-Visser spacetime in a strong deflection limit in all the nonnegative parameters of a and m. In a case of a=3m, two photon spheres and an antiphoton sphere at the throat degenerate into a marginally unstable photon sphere. The deflection angle of the light rays reflected by the marginally unstable photon sphere at the throat diverges nonlogarithmically in the strong deflection limit.