Geodesic structure of naked singularities in AdS3 spacetime

Abstract: We present a complete study of the geodesics around naked singularities in AdS 3 , the three-dimensional anti-de Sitter spacetime. These stationary spacetimes, characterized by two conserved charges -mass and angular momentum-, are obtained through identifications along spacelike Killing vectors with a fixed point. They are interpreted as massive spinning point particles, and can be viewed as three-dimensional analogues of cosmic strings in four spacetime dimensions. The geodesic equations are completely integ… Show more

“…3, a review of general features of the geodesics -timelike, spacelike and null-for the metric (1.1) is presented. The analysis considers generic and circular geodesics which complements the results presented in [7] for M > |J| (black holes), and in [8] for M < −|J| (conical singularities). This section also includes general properties of the geodesics for the remaining case |M | < |J| (overspinning singularities).…”

“…Equations (3.8) to (3.10) are the same for all BTZ spacetimes [7,8]. Although the radial motion is easily determined for each BTZ geometry, the behavior of t(λ) and θ(λ) is strongly dependent on the type of zeros of R(u) in the denominators of (3.8) and (3.9).…”

Overspinning naked singularities in AdS$_3$ spacetime

“…3, a review of general features of the geodesics -timelike, spacelike and null-for the metric (1.1) is presented. The analysis considers generic and circular geodesics which complements the results presented in [7] for M > |J| (black holes), and in [8] for M < −|J| (conical singularities). This section also includes general properties of the geodesics for the remaining case |M | < |J| (overspinning singularities).…”

“…Equations (3.8) to (3.10) are the same for all BTZ spacetimes [7,8]. Although the radial motion is easily determined for each BTZ geometry, the behavior of t(λ) and θ(λ) is strongly dependent on the type of zeros of R(u) in the denominators of (3.8) and (3.9).…”

Overspinning naked singularities in AdS$_3$ spacetime

“…T µν = ρ e u µ u ν + P r e µ r e ν r + P θ e µ θ e ν θ + P φ e µ φ e ν φ (59) where, ρ e is the energy density, and P i (i → r, θ, φ) are the principal pressure components. The Einstein field equation in the form G µν = T µν requires…”

“…The relativistic orbital precession in the Schwarzschild spacetime is discussed in [58]. There are large number of literature where the nature of the orbit precession is extensively studied in various spacetime geometry [59][60][61][62][63][64][65][66][67][68][69][70][71]. In [64,65], the periastron precession of particles orbit in static JMN1, JMN2, JNW, and Bertrand (BST) naked singularity spacetimes are studied, and the results obtained are compared with that of the Schwarzschild spacetime.…”

Shadows and precession of orbits in rotating Janis-Newman-Winicour spacetime

“…The relativistic orbital precession in the Schwarzschild spacetime is discussed in [58]. There are large number of literature where the nature of the orbit precession is extensively studied in various spacetime geometry [59][60][61][62][63][64][65][66][67][68][69][70][71]. In [64,65], the periastron precession of particles orbit in static JMN1, JMN2, JNW, and Bertrand (BST) naked singularity spacetimes are studied, and the results obtained are compared with that of the Schwarzschild spacetime.…”

Shadows and precession of orbits in rotating Janis–Newman–Winicour spacetime