_{1}

^{*}

When one presumes that the gravitational mass of a neutral massenpunkt is finite, the Schwarzschild coordinates
appear to fail to describe the region within the event horizon (EH), of a Schwarzschild Black Hole (SBH). Accordingly, the Kruskal coordinates
were invented to map the entire spacetime associated with the SBH. But it turns out that at the EH (Mitra, IJAA, 2012), and the radial timelike geodesic of a point particle would become null. Physically this would mean that, the EH is the true singularity, i.e., *M *= 0, and this zero mass BH could only be a limiting static solution which must never be exactly realized. However, since in certain cases , here we evaluate this derivative in such cases, and find that, for self-consistency, one again must have at the EH. This entire result gets clarified by noting that the integration constant appearing in the vacuum Schwarzschild solution (and not for a finite object like the Sun or a planet), is zero (Mitra, J. Math. Phys., 2009). Thus though the Schwarzschild solution for a point mass is formally correct even for a massenpunkt, such a point mass or a BH cannot be formed by physical gravitational collapse. Instead, physical gravitational collapse may result in finite hot quasistatic objects asymptotically approaching this ideal mathematical limit (Mitra & Glendenning, MNRAS Lett. 2010). Indeed
“
the discussion of physical behavior of black holes
, classical or quantum, is only of academic interest
”
(Narlikar & Padmanbhan, Found. Phys. 1989).

The concept of Black Holes (BHs) is one of the most important plinths of modern physics and astrophysics. As is well known, the basic concept of BHs originally arose due to Laplace, more than 200 years ago, in the cradle of Newtonian gravitation, where the mass of a body remains fixed during collapse. In General Theory of Relativity (GTR), the gravitational mass is less than the baryonic mass. Further, as the body contracts and emits radiation keeps on decreasing progressively along with [

where, , , and. Here, we are working with a spacetime signature of and has a distinct physical significance as the invariant circumference radius. For, the worldline of a free falling radial material particle is indeed timelike and the metric coefficients have the right signature,

But at blows up and as, the and suddenly exchange their signatures though the signatures of and remain unchanged. This is interpreted by saying that, inside the event horizon, becomes “time like” and becomes “spacelike”. However, we see that actually continues to retain, atleast partially, its spacelike character by continuing to be the “invariant circumference radius”. Also, note that, if physically meaningful quantities like the Rimennian curvature components behaved like outside the EH, they continue to behave in a similar manner, and not like inside the EH. And it should be borne in mind here that by a fresh relabelling or by any other means, the curvature components can not be made to assume the form. One particular reason for this is that, we would see later that, inside the EH, we have while, of course, the value of remains finite. Thus it may not actually be justified to conclude that becomes the “timelike coordinate” inside the EH even though changes its sign.

So far, it has not been possible to resolve this enigma of the duality in the behaviour of for, and the present paper intends to attend to this problem. Since Kruskal coordinates are believed to properly chart the SBH spacetime, it is imperative that, one studies the properties of these coordinates. In a recent paper (Pap. I) we found that the Kruskal derivative at the EH [

Although blows up at, as mentioned before, the curvature components of the Rimennian tensor appear to behave (under the assumption M > 0) perfectly normally at. Further, the determinant of the metric coefficients continues to be negative and finite. Such realizations gave rise to the idea that the Schwarzschild coordinate system suffers from a “coordinate singularity” at the event horizon and must be replaced by some other well behaved coordinate system. It is only in 1960 that Kruskal and Szekeres [9,10] discovered a one-piece coordinate system which can describe both the interior and exterior regions of a BH. They achieved this by means of the following coordinate transformation for the exterior region (Sector 1):

where

It would be profitable to note that

And for the region interior to the horizon (Sector 2), we have

where

and

Note these are the only coordinates which involve in the denominator. Given our adopted signature of spacetime, in terms of and, the metric for the entire spacetime is

The metric coefficients are apparently regular everywhere except at the intrinsic singularity. Note that, the angular part of the metric remains unchanged by such transformations and continues to signal its intrinsic spacelike nature. In either region we have

so that

and

So, very strangely, the point corresponds to not one but two conditions!

Here, one point needs to be hardly overemphasized; astronomical observations and experiments actually conform to the idea that atleast far from massive bodies or even BH Candidates (BHC), the spacetime is well described by the coordinate system. In fact, although in the (normal) physical spacetime, in a spherically symmetric spatial geometry (as defined by the implications of as an “invariant circumference radius”), the physical singularity corresponds to a mathematical point, in the Kruskal world view, this central singularity corresponds to a pair of hyperbolas in the plane. While the “+ve” sign of equation corresponds to the central BH singularity, the “−ve” sign corresponds to the singularity inside a so-called White Hole which may spew out mass-energy spontaneously in “our universe” [6,7]. The white hole singularity belongs to “other universe” whose presence is suggested by the fact that the Kruskal metric remains unaffected by the following additional transformations:

defining Sector (III) and

defining Sector 4. Thus not only does the region interior to the EH correspond to two different universes (Sectors 2 and 4), but the structure of the physical spacetime outside the EH, too, effectively corresponds to two universes (Sectors 1 and 3). Hence, if there would be separate BHs, as per the Kruskal prescription, there would be disconnected physically weird universes describing different wormholes and other universes. Hence if a massive star would indeed collapse to form BH in the universe we live, other universes would be instantly born!

The aim of this paper is to explicitly verify whether the (radial) geodesics of material particles are indeed timelike at the EH, which they must be if this idea of a finite mass Schwarzschild BH is physically correct. First note that if the test particle is released from rest at, then the conserved mass-energy per unit rest mass is given by

Note, from various considerations, in Pap. I [

Armed with this value of, we are in a position now to complete our task by rewriting the radial part of the Kruskal metric as

or,

This implies that although the metric coefficients can be made to appear regular, the radial geodesic of a material particle would become null at the event horizon of a finite mass BH in contravention of the basic premises of GTR! Therefore GTR must not allow occurrence of any EH at all [2,3]!

In fact this result could have been easily anticipated by studying the limiting behaviour of the SBH metric in Schwarzschild coordinates too (even if one would assume that Schwarzschild coordinates break down at exact). Using the vacuum Schwarzschild metric, for a radial geodesic in, one finds that find that [2,3]

i.e.,

But since

for a radial geodesic, one eventually finds that

Note that for a photon, , and the foregoing equation correctly shows that. Also, for a material particle with, it shows that indeed as long as. However even for a material particle worldline,

irrespective of the value of.

Therefore, the radial geodesic of a material particle in the Schwarzschild metric would become unphysically null in case the particle would arrive at the EH. It may be noted here that though, by definition is an infinetisimal quantity. And since is an invariant, its limiting value must not depend on the coordinates used. Accordingly, it is natural that Kruskal coordinates too should lead to as.

Note, can be obtained from several approaches, and in Pap. I, we found that form in certain cases. Accordingly, let us evaluate for such apparent cases more carefully.

First let us define a quantity

In Pap. I [2,3,8], by the brute direct approach, we found that

To evaluate this derivative very carefully, close to the EH, let us first write

Clearly, the value of depends on whether or, and let us first consider the former case:

When, we have

And thus close to the EH,

For the positive sign of, as, one finds

While for the negative sign of, one has

Thus, for, as obtained in Pap I.

For, close to the EH, one has

and

where

Simultaneously from (9), one finds that

so that

Thus, one has sets of expressions for the value of at. And as we retain terms only upto first order of, and further let whenever appropriate, from (26) we obtain:

1) and

By using the forms of and, the above expression can be seen as

If, then one will have. But, if one will have, then, once again

2) and

Again, by using the forms of and, the above expression can be seen as

If, then one will have. But, if one will have, then, once again

3) and

4) and

Thus when we consider and, we obtain self-contradictory and strange results. Apparently the cases 1) & 2) suggest that provided so that even as. Note that is an invariant, and thus such a result would be in contradiction with Equation (23) which shows that as irrespective of the value of. Indeed the hope that is belied in cases 3) & 4), which yield as before. And therefore, for a graceful exit from such a self-contradiction, one must accept that as whose physical interpretation is for a point particle.

In view of such inconsistencies for and case, it appears that the presumption, , on which the BH paradigm is based is incorrect. And even if we would momentarily accept this incorrect presumption, we would have to confront with the result that as the EH would be reached, , i.e., geodesic would become lightlike. But this possibility is inconsistent with the BH paradigm where the EH is a regular region of spacetime and where the geodesic of a material particle must be timelike, i.e.,. Since is an invariant, we can not blame the coordinate system to be faulty for such an inconsistency. So we must reject the presumption that a neutral point particle appearing in the vacuum SBH solution has a finite gravitational mass.

Therefore, clearly, for self-consistency, as far as a point mass is concerned (but not necessarily for an extended object like the Sun), one should have only. And since, can very much be finite, it appears from Equation (16) that, for a neutral point mass or a SBH, one must have.

For the SBH, there is only one spacetime singulatity which is at. Therefore, the EH and the true physical singularity must be the same:

And thus for the true SBH, one must have

Irrespective of the above interpretation, the very fact the radial geodesic would turn lightlike if it would hit the EH means that the EH is no regular region of the spactime; on the other hand, the EH must be a spacetime singularity where the “once timelike always timelike” mathematical rule would break down. This is similar to the special relativistic situation where a test particle having a timelike geodesic would turn lightlike if there would be an accelerator of infinite capacity which would push. In contrast, if finite mass SBHs would really have been allowed, one should have had irrespective of the value of and irrespective of the coordinates employed. Indeed, the occurrence of as, proves in a coordinate independent manner that for any physically meaningful definition of 3-speed, one must have as [2,3] irrespective of the coordinates used. The latter fact was even acknowledged by Crawford & Tereno [

“Since this is an unacceptable result and we know that the Schwarzschild coordinate system is not suitable for describing the manifold at it is rather tempting to blame the coordinate system for this malfunction. But we should ask first, could it be possible to find a coordinate system that does not have this defect? The answer is obviously no, since the result is independent of the choice of coordinates, ··· Indeed, even if we use a coordinate system that has no difficulties at, like the advanced Eddington-Finkelstein coordinates, we would still end up with the same result as.”

However, yet, to bypass this fact, they demanded that the speed of one infalling particle/observer having must be measured by another infalling particle/ observer having [

where, (note, in different context, we also use). And at the EH, this yields

sothat, apparently, if. In particular, if, one will have; i.e., the observer/particle would conclude that he/she is at rest at the EH. This is a profound self-contradiction because Crawford & Tereno starts with the premises that the concept of staticity vanishes at the EH and below it. In fact, in GR, the local speed must indeed be measured locally; i.e., the observer and the test particle must be at the same spatial location. In other words, the two infalling particles must have the same comoving proper time at a given spatial position. For a free fall, this can be ensured everwhere, only when the two particles/observers have the same initial conditions, i.e.,. Thus as per Crawford & Tereno, the observer must fall along with the test particle side by side! And when this is so, one must have everywhere! This is like the situation, when the speeding car driver dictates that the traffic inspector must measure his speed by sitting in the same car, in the adjacent seat [

Therefore, following Crawford & Terneno prescription, even at the central singularity

And this above absurdity can be removed by considering that at the EH, so that.

Unfortunately, the same physically nonsense ansatz for speed measurement has recently been adopted by another author too [

Even when one considers accretion of a perfect fluid onto a SBH [

Unfortunately, these authors fail to realize here that ocurrence of is not allowed in GR because this implies for the accreting fluid! On the other hand, such results actually imply that astrophysical and all other so-called BHs must be something else [14,15].

Let us also ponder, how a test particle can be prevented from hitting the EH ever in order that its timelike geodesic remains so. The test particle would never arrive at the EH, if the associated proper time would be infinite: i.e.,

Clearly this demands that the gravitational mass of the SBH.

Note, when one incorrectly presumes a BH with, one arrives at a fundamental self-contraction: As per the distant inertial observer (who actually does the experiment), the test particle can approach the EH only asymptotically, and can neither ever reach it or penetrate it. On the other hand, as per the free falling observer, he not only arrives at the EH but can reach the central singularity too. Such a dichotomy is against the principle of general covariance by which ultimate physical results must not depend on choice of coordinates, and must be same for all observers. And this fundamental inconsistency gets resolved only when one realizes that for a BH, , so that both.

Also note, unlike the case of Newtonian gravity, in GTR, state need not correspond to a configuration with zero baryonic mass. The state is simply one in which the negative gravitational energy exactly offsets the positive energy associated with and internal energy, and may indeed represent a physical singularity with infinite energy density and tidal acceleration.

On the other hand, since in Newtonian gravity, the negative self-gravitational energy does not offset the bare mass, a point particle can have arbitrary large positive mass; and hence, the concept of a finite mass BH fits better in a Newtonian context.

Even the authors who, in a desperate bid to save the black hole paradigm, invent almost ridiculous definition of “free fall speed” by which an infalling particle has even at the central singularity, were forced to conclude that [

“The solutions that do away with the interior singularity and the event horizon, although interesting in themselves, sweep the inherent conceptual difficulties of black holes under the rug. In concluding, we note that the interior structure of realistic black holes have not been satisfactorily determined, and are still open to considerable debate.” (Emphasis by the author).

If the staple topic of discussion of lakhs of textbooks and may be millions of articles and news reports have not been “satisfactorily determined” in almost 100 years, it is certain that, the paradigm itself is unphysical and faulty.

On the other hand, with the direct result that for the SBH, the entire conundrum of “Schwarzschild singularity”, swapping of spatial and temporal characters by and inside the event horizon (when the angular part of all metrics suggest that has a spacelike character even within the horizon), “White Holes” and “Other Universes” get resolved. Here we recall the wise comments of Rosen [

“So that in this region is timelike and is spacelike. However, this is an impossible situation, for we have seen that defined in terms of the circumference of a circle so that is spacelike, and we are therefore faced with a contradiction. We must conclude that the portion of space corresponding to is nonphysical. This is a situation which a coordinate transformation even one which removes a singularity can not change. What it means is that the surface represents the boundary of physical space and should be regarded as an impenetrable barrier for particles and light rays.”

This idea of Rosen is also in accordance with the idea of Einstein that the Schwarzschild type singularity is unphysical and can not occur for realistic cases [

And this paper indeed shows that in order that the radial worldlines of free falling material particles do not become null at a mere coordinate singularity, Nature (GTR) refuses to have any spacetime within the EH. And this unphysical happening is of course avoided when we realize that and there is no additional spacetime between the EH and the central singularity.

Some readers would however ignore this cogent result that for a true BH, by arguing that there are massive compact astrophysical objects and which must be BHs. Such an argument would be based on the fact that cold self-gravitating objects cannot be more massive that few solar massesin view of Chandrasekhar and Tolman OppenheimerVolkoff (TOV) limits.

Note the concepts of Chandrasekhar or TOV are based on degenerate fermions at temperature. Therefore, they are irrelevant for objects which are extremely hot and not supported by mere cold degenerate pressure. For instance there known hot stars with masses as large, and in principle, there could be radiation pressure supported stars (RPSSs) with masses as large as [7,19]. Such quasi-Newtonian RPSSs however have a lower mass limit of and they are considered as strictly static solutions. Accordingly, they must obey the Buchdahl limit [

In fact there are several other alternative BH models and all of which may have and arbitrary high mass [

Hence there is no observational proof which can mysteriously upstage the exact result obtained here.

Some readers may argue that there is an exact GR solution by Oppenheimer & Snyder (OS) which shows that sufficiently massive objects must undergo gravitational collapse to form BHs, and hence the integration constant appearing in SBH or Kruskal solution cannot be zero. The OS solution assumes the collapsing object to be homogeneous when no self-gravitating object can be strictly homogeneous [

On the other hand, realistic gravitational collapse always involves pressure gradient, heat and radiation transport [1-3,21-23]. When such complexities are invoked, there is no general exact solution of the problem, and to make progress, one has to make various simplified and favourable assumptions. Since, one never knows beforehand which of such simplifications are valid, one cannot make any general claim as to whether continued GR collapse gives rise to BHs or Naked Singularities, or some other non-singular objects. As to the various claims about the occurrences of naked-singularities, we may recall [

“Although some theoretical counterexamples have been constructed, the general consensus is that these are all too artificial too occur naturally.”

In fact, same is true for all claims of BH formation in continued gravitational collapse too. In order to claim that, a spacetime singularity has been formed, it is not enough to find whether some light rays can escape outside before being trapped (on which claims of naked singularities are based). On the other hand, one must faithfully compute the comoving proper time all the way to confirm that. Such a computation is possible only for the fictitious dust case, and for no physically realistic case. Thus all claims of formation of “naked singularities” are non-sound.

In fact by virtue of the general proof that trapped surfaces are actually not formed [31,32], it is most likely that continued collapse results in non-singular objects having external radius [2,3]. The proof for non-occurrence of trapped surfaces was also offered by Kriele [

As the contracting objects would keep on losing mass energy, it is likely that, they would approach the true BH state. However, this state must not be allowed to be formed in finite commoving proper time, i.e., ever. This must be so because even for a, BH, the timelike geodesic of an infalling material particle would tend to turn lightlike if the particle would ever arrive at the EH. Therefore, the most logical scenario seems to be one where continued gravitational collapse would indeed continue indefinitely (Eternally Collapsing Object: ECO) [22,23,31,32,36]. Since astrophysical plasma is always associated with imbedded magnetic field, ECO are expected to be ultra-magnetized with a pulsar like magnetosphere around. Thus it is quite likely the GR collapse results in the formation of Magnetospheric Eternally Collapsing Objects (MECOs).

Even if one would prima-facie accept the BH paradigm which is based on the presumption that the integration constant appearing in the vacuum Schwarzschild solution is finite for a massenpunkt or a “point mass” too, one lands up in many puzzles and unphysical happenings. For instance, one must wonder, if the EH is indeed a perfectly non-singular regular region, why would it require an infinite upward boost for an object to stay put there [

“I give arguments showing that the reference system is not maximally extended, as is commonly reported in the literature. On both Novikov and Kruskal Szekeres spacetime diagrams, the left-hand side, corresponding to negative values of the spatial coordinate, should not be included when describing a physical spacetime. In turn, this means we have to rethink widely-accepted concepts such as black and white holes that arise from the usual picture of a maximally-extended Kruskal Szekeres spacetime”.

Antoci & Liebscher [

However what these authors have not pointed out is a much simpler and profoundly fundamental incongruity associated with the Kruskal coordinates. Note the original problem of the static central gravitational field, i.e., the Schwarzschild solution, is solved by using the natural assumption that the spacetime is asymptotically flat. Here, for, one must recover the Minkowski metric:

Very oddly, the Kruskal solution is NOT asymptotically flat.

As, the Kruskal metric becomes

One may recoincile this with the previous equation only by presuming at when in the original problem, at. Thus Kruskal metric brazenly contradicts the foundations of the very problem it purported to solve. Actually, even in the limit, , the skewed “Kruskal manifold is topologically different from the Minkowski manifold” [

As far as Differential Geometry and mathematics are concerned, one can indeed conceive of complex manifolds which cannot be covered by a single coordinate chart and may possess any number of strange properties. Such exercises could delight many mathematicians and keep them absorbed; but that does not mean that, the observable physical spacetime must be such complex, convoluted, strange and often self-contradictory. For instance, one may easily conceive of not ony 5-D but 26-D or any dimensional spacetime, and arrive at billions of exact solutions. Many such solutions could also suggest existence of even stranger kind of BHs, wormholes and what not. But such mathematical extravaganza need not have any relationship with the observable physical world.

Even for the innocuous 4-D GTR, most of the “exact solutions” could be physically misleading, and actually vacuous. For instance, it was recently found that, the innocuous simple problem of a strictly uniform density self-gravitating sphere is vacuous, because it actually corresponds to [

In GR, one is in principle free to use arbitrary coordinates; but the use of complex, convoluted coordinates invented by one mathematician after another need not lead to new physical realities. Similarly, while coordinate transformations could sometimes be mathematically convenient, they themselves must not lead to new physical realities. Accordingly, the very idea that the Kruskal coordinates are the most ideal coordinates and reveal various universes, white holes, worm holes etc. and which are not revealed by other coordinates are against the spirit of the principle of general covariance. Only if a specific coordinate can be associated with geometrically or physically relevant quantities, it may be considered as a better coordinate to represent the inherent physical reality despite the principle of covariance. And the Kruskal coordinates by no way could be related to any physical observables. As we just found, they even blatantly contradict the basic fact that the concerned spacetime is asymptotically flat. Note, the Kruskal coordinates are constructed by using Schwarzschild/Hilbert coordinates. And if are “bad” coordinates, how can the coordinates made out of them could be “good” coordinates?

We feel that the reason that the Kruskal coordinates give an infinite physical distortion is that they involve division by zero (see and terms in Equations 2-3), because the mass of the point particle has been found to be zero. In contrast, the Schwarzschild radial coordinate has direct geometrical significance because, by definition, , represents the invariant area of 2-surfaces around the centre of symmetry. In view of such an invariant character, defines the luminosity distance too. Similarly, the Schwarzschild coordinate has a solid physical implication as the proper time measured by a distant inertial observer. Thus in reality, the Schwarzschild coordinates are the most appropriate coordinates for studying a problem having a spherical symmetry. (Note, this so-called “Schwarzschild coordinate” and the metric are originally due to Hilbert, and not due to Schwarzschild). On the other hand, these physically significant coordinates appear not to cover the interior region of a fictitious BH whose idea crops up when one one incorrectly presumes that even a neutral point particle has finite gravitational mass. In contrast, in Newtonian gravitation, a point particle may be assumed to have arbitrary mass. And as far as GR is concerned, there may not be any strictly point particle at all.

The great expectation that the Kruskal extension represents a new and complete physical picture was rightly dismissed by Dirac in 1962 [

“The mathematicians can go beyond this Schwarzschild radius, and get inside, but I would maintain that this inside region is not physical space, because to send a signal inside and get it out again would take an infinite time, so I feel that the space inside the Schwarzschild radius must belong to a different universe and should not be taken into account in any physical theory.”

From a different consideration, Kiselev, Logunov, & Mestvirishvili too have shown that finite mass BHs are in contradiction with GTR [

“Nevertheless there are several conceptual difficulties associated with this simple and elegant solution that are usually ignored because of its manifest usefulness.”

“For the detection of any object by whatever means, it must come within the observer’s past lightcone. This does not ever happen for a BH. So none of the laws describing the behavior of BHs (as opposed to the Quasi BHs) are in principle detectable or testable by the class of observers who stay outside their event horizons. Since most observers (including those on the Earth) are of this type, to them the BH’s are not relevant as physical objects” [

“We therefore find that considering observers inside the event horizon makes the problems of interpretation even more difficult, and we wonder whether nature allows gravitational collapse to continue inside the event horizon at all” [

Indeed the SBH solution is exact and beautiful; and therefore, the resolution to all such paradoxes can be made only when we realize that while the integration constant is indeed finite for an extended object, it shrinks to zero as the radius of the object shrinks to zero. In 1969, Bel noted that [

“Actually, several extensions have been proposed in the literature, the most commonly quoted being those of Finkelstein and Kruskal. Both extensions lead to spacetime models which are not globally static and are consequently inadequate for representing the exterior solution of a source in static equilibrium.”

Then by considering intrinsic differential geometry associated with the problem, Bel concluded that [

“Schwarzschild singularity becomes instead a real point singularity on which are localized the sources of the exterior static solution” (Emphasis by the author).

This means that the point particle is synomous with the Event Horizon, as has been repeatedly stressed by this author while being unaware about Bel’s ignored conclusion.

Of course, one obtains BH like solutions in many other gravity theories and all quantum gravity theories too. But everywhere it must be the same story; the BH solutions represent asymptotic static limits of dynamical solutions characterized by and never realizable in physical world. Thus mathematical studies of BHs and questions like how such vacuum solutions can possess huge entropies and micro-states are only idle mathematical exercises without any physical content. In view of the asymptotic BH solution, we realize that “point particles/ singularities” are never allowed by GTR even though the concept of such a “point particle” is required for mathematical tractability. Given this, the concept of elementary “strings” or “branes” seem to be important ones; such concepts, by definition, eliminate the point singularities. But ironically the super-string theories too take the appearances of static BH solutions seriously when the very concept of extended “strings” and “branes” are anti-thesis of singularities!

Irrespective of the present study, there have been already direct proof that the integration constant appearing in the vaccuum Schwarzschild/Hilbert solution is zero [31,32,47,48]. Thus the massive compact BH candidates cannot be true BHs. Indeed there are significant amount of observational evidences, that the so-called BH candidates could be ultracompact, ultramagnetized, ultrahot balls of plasma [49-55]. Recall that the Sun too is a magnetized plasma and the violent eruptions like Coronal Mass Ejection (CME) could be traced to such magnetized plasma ativities. Similarly, much of the violent activities associated with the so-called BH candidates may be triggered by relativistic version of CMEs from the ultra-magnetized plasma of MECOs. Even if uncharged BHs would be assumed to be spinning, they are electromagnetically inert because no current can flow out of the central singularity, and no energy can be extracted [

Very recently, the Event Horizon Telescope has imaged a plasma jet coming out from a region within. Since it is bent by the gravitation of the central compact object [

We note here that the faith in the non-existent “Event Horizon” and the pretention to be unaware about the relevant developments, have driven theoretical physics in a vicious blind alley. When Quantum Gravity is supposed to remove the BH singularity, it has actually been invoked to enhance the notion of BHs. On the one hand, physical reality of BHs are insisted by claiming that “the EH is a regular space-time in VACUUM, a mere coordinate singularity, with no physical effects”. On the other hand, the same EH is modeled sometimes as “membranes”, sometimes as “fluids”, sometimes as “Fuzzball”, sometimes as hard “brick walls”, and now as “Firewalls” [

Similarly, hypothetical magical effects associated with the claimed non-physical “coordinate singularity” have inspired formulation of mystic “Emergent Gravity” [

“The discussion of physical behavior of black holes, classical or quantum, is only of academic interest” [

A preprint by the same title (arXiv:astro-ph/9904162v1) has been there on Cornell Univ. Preprint ArXiv for the past 13 years. The fact that, this preprint has not received any criticism for 13 long years implies that its basic content is correct. The present version is a massive revision of the same preprint, it encompasses all the related developments that have taken place over 13 years; and practically, this is a highly updated new paper. It is nice to see that two anonymous referees of IJAA verified/ corrected all the relevant calculations.

The author thanks the anonymous referees for pointing out some errors/typos in the initial two versions of this manuscript. He also thanks IJAA for waiving the processing fee in view of the importance of this paper.