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ISRN Mathematical Physics
Volume 2012 (2012), Article ID 869069, 13 pages
Remarks on Null Geodesics of Born-Infeld Black Holes
Department of Physics and Geology, Northern Kentucky University, Highland Heights, KC 41099, USA
Received 9 April 2012; Accepted 18 July 2012
Academic Editors: M. Ehrnström, D. Gepner, M. Rasetti, and P. Roy
Copyright © 2012 Sharmanthie Fernando. This is an open access article distributed under the Creative Commons Attribution License, which permits unrestricted use, distribution, and reproduction in any medium, provided the original work is properly cited.
We present interesting properties of null geodesics of static charged black holes in Einstein-Born-Infeld gravity. These null geodesics represents the path for gravitons. In addition, we also study the path of photons for the Born-Infeld black hole which are null geodesics of an effective geometry. We will present how the bending of light is effected by the non-linear parameter of the theory. Some other properties, such as the horizon radius and the temperature are also discussed in the context of the nonlinear parameter .
In Maxwell theory, the field of a point-like charge is singular at the origin. Hence, it has infinite self-energy. To avoid this, Born-Infeld proposed a theory of electrodynamics which is nonlinear in nature which is now known as Born-Infeld electrodynamics . In this theory, the electric filed of a point charge is given as which is regular at the origin. Also, its total energy is finite. Born-Infeld theory has received renewed interest since it turns out to play an important role in string theory. Born-Infeld actions naturally arises in open superstrings and in D-branes . Review articles on the aspects of the Born-Infeld theory in string theory is written by Gibbons  and Tseytlin .
In this paper, we study null geodesics in the black holes of Einstein-Born-Infeld gravity. The particular black hole in consideration is the nonlinear generalization of the well known Reissner-Nordstrom black hole characterized by charge , , and . Black hole solutions for Born-Infeld gravity was obtained by Garcia et al.  in 1984. Two years later, Demianski  also presented a solution known as EBIon. There are many papers written in the literature, addressing various aspects of black holes in Einstein-Born-Infeld gravity. Due to the long list, we will mention only a few recent work here.
Kruglov published on generalized Born-Infeld electrodynamics in . Thermodynamics of third-order Lovelock-Born-Infeld black holes were studied by peng et al. . Thin shells in Einstein-Born-Infeld theory were studied by Eiroa and Simeone . Linear alanlogs of the Born-Infeld and other nonlinear theories were presented by Milgrom . Test particle trajectories for the static-charged Born-Infeld black hole were discussed by Breton . Gibbons and Herdeiro  derived a Melvin Universe-type solution describing a magnetic field. The current author has studied the gravitational, scalar, and Dirac perturbations of the Born-Infeld black holes in [13–15], respectively. Non-abelian black hole solutions to Born-Infeld gravity were presented by Mazharimousavi et al. . Hairy mass bound in the Einstein-Born Infeld black holes were given by Myung and Moon .
2. Static Charged Black Hole in Einstein-Born-Infeld Gravity
The Einstein-Born-Infeld gravity is given by the action where is a function of the field strength given as Here, has dimensions and . We will assume in the rest of the paper. Note that when the nonlinear parameter , the function approaches the one for Maxwell’s electrodynamics given by .
The static-charged black hole solution with spherical symmetry for the above action in (2.1) is given as
Here is the hypergeometric function.
The electric field is given by
In this case, the reduces to
One can observe that there is an upper bound for the electric field as . This is one of the leading characteristics of Born-Infeld electrodynamics which leads to finite self-energy of the electron as compared to Maxwell electrodynamics.
When the non-linear parameter , the function approaches which is the metric function for the static charged black hole in Einstein-Maxwell gravity which is known as the Reissner-Nordstrom black hole. Reissner-Nordstrom black hole has horizons at
For the Born-Infeld black hole, near the origin, the function has the behavior as,
Hence, for , for small and for , for small . When , for all values of and , . In fact graphically, we will show that for various values of , and , that could have two roots, one root, or none. Extreme black holes are possible when and , leading to the horizon radius as
It is clear that extreme black holes exist only if . In Figure 1, the function is plotted for both and .
In Figure 2, the horizon radius is computed for various values of . The horizon radius decreases with . For the same values of and , the horizon radius for the Reissner-Nordstrom black hole is given by .
The Hawking temperature of the Born-Infeld black hole is given by
Here, is the event horizon of the black hole such that . In Figure 3, a graph for temperature versus is plotted. It seems the temperature has a maximum before decreasing for this particular values of and .
To compare the temperature of te Born-Infled black hole to the Reissner-Nordstrom black hole, one can compute the temperature for the outer horizon given in (2.8) as,
For the same values of and given in the Figure 3, the temperature for the Reissner-Nordstrom black hole is given as . Hence, the Reissner-Nordstrom black hole is “hotter” compared to its counterpart in Born-Infeld gravity. The zeroth and the first law of the Born-Infeld black holes are discussed by Rasheed in .
3. Null Geodesics of the Born-Infeld Black Hole
The motion of graviton in the background of the Born-Infeld black hole is given by the null geodesics. In general, it is also the path of photons, which is not the case here. This will be discussed in Section 4.
The geodesic equations for the Born-Infeld black hole can be derived from the Lagrangian equation
Here, is an affine parameter along the geodesics. The derivation is clearly given in the well known book by Chandrasekhar . Therefore, we will skip some of the details here. Since the Born-Infeld black holes have two Killing vectors and , there are two constants of motion which can be labeled as and given as
Here, we will choose and as the initial conditions, which leads to, . Hence, will remain at and the geodesics will be described in an invariant plane at . From (3.2),
By substituting these values to the Lagrangian in (3.1), one obtains the geodesics as,
Here, . corresponds to null geodesics and corresponds to time-like geodesics. Note that (3.5) can be written as, , with the effective potential,
3.1. Effective Potential for Null Geodesics
We will only consider the gravitons with nonzero angular momentum here. In Figure 4, the is given for various values of . The height for the Born-Infled black hole is shorter in comparison with the Reisnner-Nordstrom black hole.
In Figure 5, the effective potential is plotted for three different energy levels, , , and . This gives different scenarios of motion of the particles which are described below.
Case 1 (). Here, leads to circular orbits. From the nature of the potential at , one can conclude that these are unstable circular orbits.
Case 2 (). Here, the motion is possible only in the regions where, .
Case 3 (). Since and for all values, motion is possible for all values.
For Case 1, one can compute the radius of the circular orbits. The conditions for the circular orbits are
4. Null Geodesics of the Effective Geometry
In general, the motion of photons are represented by the null geodesics of the space-time. However, in nonlinear electrodynamics, the path of the photons are not given by the null geodesics of the background metric. The path is given by null geodesics of an effective geometry generated by the self-interaction of the electromagnetic field. This effective geometry depends on the particular nonlinear theory considered, and in Einstein-Born-Infeld gravity, the effective geometry is given by where
Hence, gravitational lensing, which is related to the bending of light around the black hole can be computed from the knowledge gained from null geodesics of the effective geometry. The derivation leading to the null geodesics are similar to the one given in Section 3. Since the symmetries are the same, there will be two conserved quantities as,
The equations can be given as , where the effective potential, which depends on , and is given as follows:
4.1. Circular Orbits
The conditions for the circular orbits are
These two conditions lead to the equation
One can obtain a solution for the circular orbits at by solving (4.7) numerically.
From Figure 7, it is clear that decreases for increasing values. The circular orbit at are unstable. The radius of the circular orbit is related to and as
When and , which is the radius of the unstable circular orbit of the Schwarzschild black hole .
4.2. Bending of Light
Since , where is the impact parameter, the above equation simplifies to,
Gravitational lensing of the photons in the Born-Infeld black hole was studied by Eiroa . In an interesting paper by Amore , analytical expression for the bending angle was derived. Here, we will use that expression which is given as
In this paper, we have done a detailed study of null geodesics of the Born-Infeld black hole for the gravitons and the photons. Unlike in other cases, null geodesics of the black hole is not the path of the photons. Path for photons are given by an effective geometry. We have studied the bending of light and showed that the bending angle increases with the nonlinear parameter . On the other hand, the bending angle decreases with the impact parameter .
We have also discussed the thermodynamics of the black hole and showed how the temperature vary with . For the same mass and the charge, the corresponding Reissner-Nordstrom black hole is “hotter”.
The horizon radius also seems to decrease with the increasing for the particular mass and charge considered.
In extending this work, it would be interesting to study massive test particles around the Born-Infeld black hole.
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