Fuzzball (string theory): Difference between revisions
Rv editing against consensus Tags: Manual revert Reverted |
Restoring my work on the article so I can continue to improve it |
||
Line 1: | Line 1: | ||
{{Short description|Quantum description of black holes}} |
{{Short description|Quantum description of black holes}} |
||
{{string theory}} |
{{string theory}} |
||
''' |
'''Fuzzballs''' are a hypothetical object in [[superstring theory]], intended to provide a fully quantum description of the [[black hole]]s predicted by [[general relativity]]. |
||
Fuzzball theory dispenses with the singularity at the heart of a black hole by positing that the entire region within the black hole's [[event horizon]] is actually an extended object: a ball of strings, which are advanced as the ultimate building blocks of matter and light. Under [[string theory]], strings are bundles of energy vibrating in complex ways in both the three physical dimensions of space as well as in ''compact directions''—extra dimensions interwoven in the [[quantum foam]] (see ''Fig. 2'' and [[#Testability_of_the_theory|''Fig. 8'']], below).<ref name="Ouellette">[https://www.quantamagazine.org/how-fuzzballs-solve-the-black-hole-firewall-paradox-20150623/ "The Fuzzball Fix for a Black Hole Paradox"], Jennifer Ouellette, ''Quanta Magazine'', (June 23, 2015)</ref> |
Fuzzball theory dispenses with the singularity at the heart of a black hole by positing that the entire region within the black hole's [[event horizon]] is actually an extended object: a ball of strings, which are advanced as the ultimate building blocks of matter and light. Under [[string theory]], strings are bundles of energy vibrating in complex ways in both the three physical dimensions of space as well as in ''compact directions''—extra dimensions interwoven in the [[quantum foam]] (see ''Fig. 2'' and [[#Testability_of_the_theory|''Fig. 8'']], below).<ref name="Ouellette">[https://www.quantamagazine.org/how-fuzzballs-solve-the-black-hole-firewall-paradox-20150623/ "The Fuzzball Fix for a Black Hole Paradox"], Jennifer Ouellette, ''Quanta Magazine'', (June 23, 2015)</ref> |
||
Fuzzballs provide resolutions to two major open problems in black hole physics: |
|||
# |
# They avoid the [[gravitational singularity]] that exists within the event horizon of a black hole. General relativity predicts that at the singularity, the curvature of spacetime becomes infinite, and it cannot determine the fate of matter and energy that falls into it. Physicists generally believe that the singularity is not a real phenomenon, and proposed theories of [[quantum gravity]], such as superstring theory, are expected to explain its true nature.<ref>{{cite web |
||
| url = https://www.quantamagazine.org/black-hole-singularities-are-as-inescapable-as-expected-20191202/ |
|||
| title = Black Hole Singularities Are as Inescapable as Expected |
|||
| last = Nadis |
|||
| first = Steve |
|||
| date = 2 December 2019 |
|||
| website = quantamagazine.org |
|||
| publisher = [[Quanta Magazine]] |
|||
| access-date = 22 April 2020 |
|||
| archive-date = 14 April 2020 |
|||
| archive-url = https://web.archive.org/web/20200414150244/https://www.quantamagazine.org/black-hole-singularities-are-as-inescapable-as-expected-20191202/ |
|||
| url-status = live |
|||
}}</ref> |
|||
# It resolves the [[black hole information paradox]]: the quantum information of matter falling into a black hole is trapped behind the event horizon, and seems to disappear from the universe entirely when the black hole evaporates due to [[Hawking radiation]]. This would violate a fundamental law of quantum mechanics requiring that quantum information be conserved.<ref name="Ouellette" /><ref>"The fuzzball paradigm for black holes: FAQ", Samir D. Mathur, (January 22, 2009) ([https://www.asc.ohio-state.edu/mathur.16//faq2.pdf 395 KB])</ref> |
|||
As no direct experimental evidence supports either string theory or fuzzball theory, both are products purely of calculations and theoretical research.<ref name="Conlon">"Why String Theory?", Joseph Conlon, CRC Press, (2016) {{ISBN|978-1482242478}}</ref> However, the existence of fuzzballs may be testable through [[gravitational-wave astronomy]].<ref name="Italian2021">[https://physics.aps.org/articles/v14/s110 "A Way to Experimentally Test String Theory's 'Fuzzball' Prediction"], APS Journals, (September 16, 2021)</ref><strong style="font-size:40%;"><p> </p></strong> |
|||
THIS IS ONE OF MANY “EMPTY” EDITORS NOTES INSERTED TO MAKE IT *FAR* |
|||
EASIER TO PARSE CODE AND DISTINGUISH BETWEEN REFERENCES AND BODY TEXT |
|||
AS WELL AS LOCATE INDIVIDUAL PARAGRAPHS IN IMAGE-CAPTION TEXT WHILE |
|||
EDITING. |
|||
DELETING AND/OR MODIFYING WIKICODE FOR THE EXPRESS OBJECTIVE OF MAKING |
|||
IT LOOK SIMILAR TO CODING ELSEWHERE CAN FOUL THINGS UP AND REQUIRE LOTS |
|||
OF UNNECESSARY WORK FOR OTHERS WHO ARE VOLUNTEERING THEIR TIME TO THIS |
|||
PROJECT. |
|||
THE ALSO GOES FOR MARKUP LIKE </p><p>, WHICH IS REQUIRED TO |
|||
PRODUCE PARAGRAPHS IN IMAGE CAPTIONS. |
|||
IF THERE IS CODING THAT LINTER *CAN* CHANGE BUT THAT MediaWiki extension |
|||
AUTOMATICALLY AND SUCCESSFULLY CLEANS UP, CONSIDER LEAVING THEM AS IS; |
|||
EITHER THAT, OR PLEASE TAKE GREAT CARE TO PROOFREAD TO ENSURE THAT |
|||
“BEFORE” AND “AFTER” APPEAR IDENTICAL AND NOTHING GOT BROKEN, LIKE |
|||
TWO NUMBERED PARAGRAPHS IN A SHORT LIST THAT ARE BOTH NUMBERED “1.” |
|||
CODE CLEANUP THAT DOESN’T BREAK THINGS OR MAKE EDITING MORE DIFFICULT |
|||
IS MUCH APPRECIATED. THANKS. |
|||
By User:Greg L, October 4 (Wednesday) 2023 |
|||
--><ref group="Note">The smallest linear dimension in physics that has any meaning in the measurement of spacetime is the [[Planck length]], which is {{val|1.616255|(18)|e=-35|u=m}} ([http://physics.nist.gov/cgi-bin/cuu/Value?plkl CODATA value]). Below the Planck length, the effects of quantum foam dominate and it is meaningless to conjecture about length at a finer scale, much like how meaningless it would be to predict—one minute into the future—the location of a buoy floating in storm-tossed seas to a precision of one millimeter. |
|||
If singularities exist, and if they have non-zero diameters with a density equal to the [[Planck density]] ({{val|5.155|e=96|u=kg/m<sup>3</sup>}}), then even a minimal {{solar mass|2.7}} singularity would have a definite non-zero volume with a diameter of {{val|7.8|e=12|u=Planck lengths}} ({{val|1.26|e=-22|u=m}}), which may seem large but is still far smaller than an electron and is even a thousand times smaller than the minimum dimension that can be probed with a world-class 10 TeV particle accelerator ({{val|e=-19|u=m}}). |
|||
Alternatively, if a minimal {{solar mass|2.7}} singularity has a quantum-limited size of [[Planck units#Derived units|one Planck volume]], then it has a "fuzzy" density averaging {{val|1.27|e=135|u=kg/m<sup>3</sup>}}, which far exceeds the Planck density. |
|||
Lastly, if singularities have truly infinite density, they necessarily have literally zero volume; which is to say, not even one Planck length in diameter. |
|||
This inability to describe the exact nature of singularities speaks to the dilemma of physics theories wherever their mathematical formulas have a zero being used as a divisor and the known laws of physics have been declared to have "broken down"; it is often an indicator that a theory is incomplete.</ref> <!-- |
|||
-->Modern physics breaks down under such extremes because gravity would be so intense that spacetime itself breaks down catastrophically.<!-- |
|||
--> |
|||
# It resolves the [[black hole information paradox]] wherein conventional black hole theory holds that the [[quantum information]] describing the light and matter that falls into a classic black hole is thought to either be: A) extinguished within singularities, or B) somehow preserved within singularities but the quantum information cannot climb up against the infinite gravitational intensity inside a black hole to reach past the event horizon where it would be visible to regular spacetime. Either situation violates a fundamental law of quantum mechanics requiring that quantum information be conserved.<ref name="Ouellette" /><ref>"The fuzzball paradigm for black holes: FAQ", Samir D. Mathur, (January 22, 2009) ([https://www.asc.ohio-state.edu/mathur.16//faq2.pdf 395 KB])</ref> |
|||
As no direct experimental evidence supports either string theory or fuzzball theory, both are products purely of calculations and theoretical research.<ref name="Conlon">"Why String Theory?", Joseph Conlon, CRC Press, (2016) {{ISBN|978-1482242478}}</ref> However, fuzzball theory may be testable through [[gravitational-wave astronomy]].<ref name="Italian2021">[https://physics.aps.org/articles/v14/s110 "A Way to Experimentally Test String Theory's 'Fuzzball' Prediction"], APS Journals, (September 16, 2021)</ref><strong style="font-size:40%;"><p> </p></strong> |
|||
== Physical properties == |
== Physical properties == |
||
Line 95: | Line 69: | ||
Though such densities are almost unimaginably extreme, they are, mathematically speaking, infinitely far from infinite density. Although the densities of typical stellar-mass fuzzballs are extreme—about the same as neutron stars—their densities are many orders of magnitude less than the [[Planck density]] ({{val|5.155|e=96|u=kg/m<sup>3</sup>}}), which is equivalent to the mass of the universe packed into the volume of a single atomic nucleus. |
Though such densities are almost unimaginably extreme, they are, mathematically speaking, infinitely far from infinite density. Although the densities of typical stellar-mass fuzzballs are extreme—about the same as neutron stars—their densities are many orders of magnitude less than the [[Planck density]] ({{val|5.155|e=96|u=kg/m<sup>3</sup>}}), which is equivalent to the mass of the universe packed into the volume of a single atomic nucleus. |
||
As can be seen below in ''Fig. 4'', since the mean densities of fuzzballs (and the effective densities of classic black holes) decrease as the inverse square of their mass, fuzzballs greater than {{solar mass|7}} are actually less dense than neutron stars possessing the minimum possible density. Due to the mass-density inverse-square rule, fuzzballs need not even have unimaginable densities. [[Supermassive black hole]]s, which are found at the center of virtually all galaxies, can have modest densities. For instance, [[Sagittarius A*]], the black hole at the center of our Milky Way galaxy, is 4.3 million {{Solar mass}}. Fuzzball theory predicts that a non-spinning supermassive black hole with the same mass as Sagittarius A* has a mean density "only" 51 times that of gold. Moreover, at 3.9 billion {{Solar mass}} (a rather large super-massive black hole), a non-spinning fuzzball would have a radius of 77 [[astronomical unit]]s—about the same size as the [[Solar System#Heliopause|termination shock]] of the Solar System's heliosphere—and a mean density equal to that of the Earth's atmosphere at sea level (1.2 kg/m<sup>3</sup>).<ref name="Vttoth" /> |
As can be seen below in ''Fig. 4'', since the mean densities of fuzzballs (and the effective densities of classic black holes) decrease as the inverse square of their mass, fuzzballs greater than {{solar mass|7}} are actually less dense than neutron stars possessing the minimum possible density. Due to the mass-density inverse-square rule, fuzzballs need not even have unimaginable densities. [[Supermassive black hole]]s, which are found at the center of virtually all galaxies, can have modest densities. For instance, [[Sagittarius A*]], the black hole at the center of our Milky Way galaxy, is 4.3 million {{Solar mass}}. Fuzzball theory predicts that a non-spinning supermassive black hole with the same mass as Sagittarius A* has a mean density "only" 51 times that of gold. Moreover, at 3.9 billion {{Solar mass}} (a rather large super-massive black hole), a non-spinning fuzzball would have a radius of 77 [[astronomical unit]]s—about the same size as the [[Solar System#Heliopause|termination shock]] of the Solar System's heliosphere—and a mean density equal to that of the Earth's atmosphere at sea level (1.2 kg/m<sup>3</sup>).<ref name="Vttoth">Vttoth.com: [https://www.vttoth.com/CMS/physics-notes/311-hawking-radiation-calculator Hawking radiation calculator]</ref> |
||
=== Neutron star collapse === |
=== Neutron star collapse === |
||
Black holes (or fuzzballs) are produced in various ways, most of which are exceedingly violent mass-shedding events like [[supernova]]s, [[kilonova]]s, and [[hypernova]]s. However, an [[Accretion (astrophysics)|accreting]] neutron star (one slowly siphoning off mass from a companion star) that exceeds a critical mass limit, ''M''<sub>max</sub>, will suddenly and nonviolently (relatively speaking) collapse into a black hole or fuzzball. Such a collapse can serve as a helpful case study when examining the differences between the physical properties of neutron stars and fuzzballs. |
Black holes (or fuzzballs) are produced in various ways, most of which are exceedingly violent mass-shedding events like [[supernova]]s, [[kilonova]]s, and [[hypernova]]s. However, an [[Accretion (astrophysics)|accreting]] neutron star (one slowly siphoning off mass from a companion star) that exceeds a critical mass limit, ''M''<sub>max</sub>, will suddenly and nonviolently (relatively speaking) collapse into a black hole or fuzzball. Such a collapse can serve as a helpful case study when examining the differences between the physical properties of neutron stars and fuzzballs. |
||
Neutron stars have a maximum possible mass, known as the [[Tolman–Oppenheimer–Volkoff limit]]; this limit is not precisely known, but it is believed to lie between {{solar mass|2.2}} and {{solar mass|2.9}}. If a neutron star exceeds this mass, [[Degenerate matter#Neutron degeneracy|neutron degeneracy pressure]] can no longer resist the force of gravity and it will rapidly collapse until some new physical process takes over. In classical general relativity, the collapsing neutron star reaches a critical density and forms an event horizon; to the outside universe it becomes a black hole, and the collapse proceeds towards a gravitational singularity. In the fuzzball model, the [[hadron]]s in its core (neutrons and perhaps a smattering of protons and [[meson]]s) decompose into what could be regarded as the final stage of degenerate matter: a ball of strings, which fuzzball theory predicts is the true quantum description of not only black holes but theorized [[quark star]]s composed of [[QCD matter|quark matter]]. |
|||
Following the length of the double-ended red arrow in ''Fig. 4'', a collapsing {{solar mass|2.48}} neutron star, which is already a supernova remnant, will quietly produce a fuzzball with very nearly the same mass but with a radius of only 7.32 kilometers (reduced from around 13.5 kilometers) and with a density that increased six-fold, from roughly {{val|5|e=17|u=kg/m<sup>3</sup>}} to {{val|3.00|e=18|u=kg/m<sup>3</sup>}}. |
|||
[[File:Neutron star and fuzzball radii.png|thumb|center|584px|'''Figure 4 ''' This graph shows the radii and densities of neutron stars and non-spinning fuzzballs (or the event horizon of classic non-spinning black holes) for a given mass. For classic black holes, the blue isolines are ''effective'' densities wherein the mass of their singularities are divided by the volume of their event horizons. For fuzzballs, the isolines represent ''mean'' densities since fuzzballs are theorized to possess a density gradient that is greatest at their centers. The gray ''Collapse region'' spans from 2.18 to 2.9 solar masses and delineates the uncertain density at which neutron stars must collapse; the exact threshold is unknown since the relativistic [[equation of state]] of neutron stars and spin effects are not fully understood. The {{solar mass|2.18}} value is the lower limit of the largest known neutron star ([[PSR J0952–0607]] {{nowrap|(2.18–2.52 {{solar mass}})}}, whereas {{solar mass|2.9}} is the upper end of [[Tolman–Oppenheimer–Volkoff limit]]. The width of the pink ''Neutron stars'' line delineates the uncertainty in neutron star density {{nowrap|(3.9–{{val|5.9|e=17|u=kg/m<sup>3</sup>}})}}, which comes from an analysis of [[GW170817]] that yielded a radius of 10.4–11.9 km for a {{solar mass|1.4}} neutron star.<ref>The magnitude of the density slope normalized to {{solar mass|1.4}} is established by "Stringent constraints on neutron-star radii from multimessenger observations and nuclear theory", Collin D. Capano ''et al.'', Max Planck Institute for Gravitational Physics, [https://arxiv.org/abs/1908.10352 arXiv:1908.10352] (August 27, 2019). DETAIL: Collin calculated a radius for a {{solar mass|1.4}} neutron star of {{val|11.0|+0.9|-0.6|u=km}} (10.4–11.9 km with a 90% credible interval), which is a density of ({{val|5.0|+0.9|-1.1|e=17|u=kg/m<sup>3</sup>}}). The adherence to a constant-density isoline beyond {{solar mass|1.4}} is in general accordance with "The Behavior of Matter under Extreme Conditions", Frederik B. Paerels ''et al.'', [https://arxiv.org/abs/0904.0435 arXiv:0904.0435], ''Fig. 2'' (April 2, 2009)</ref> The slope of the black fuzzball line is the Schwarzschild function, 2953 {{nowrap|meters per {{Solar mass}}.}} The red double-ended arrow lies at {{solar mass|2.48}}; see the preceding paragraphs for details.]] |
|||
<br> |
|||
[[File:Neutron star collapse animation.gif|thumb|300px|'''Figure 5 ''' This animation shows the collapse speed of a {{solar mass|2.48}} neutron star as it becomes a black hole. The initial half-kilometer reduction in radius from 13.5 to 13 kilometers occurs over a barely perceptible one-eighth of a second (125 ms). The remainder of the collapse—from around 13 to 7.32 kilometers—requires only 0.7 ms more as the neutron star's surface accelerates to about half the speed of light. In this video, which runs at 33⅓ frames per second, the black hole forms only four frames after the countdown timer reaches zero. For a sense of scale, it takes 51 minutes when driving at 100 km/hr (62 mph) to travel a distance comparable to the circumference of this neutron star (85 km).]]<!-- |
|||
-->As measured by a comoving observer outside a neutron star's gravitational influence (in the parlance of physicists, "for a stationary observer at infinity"), the collapse of an accreting neutron star (the time spent traveling down the double-ended red arrow in ''Fig. 4'', above) occurs in only about one-eighth of a second; this speed is shown in the ''Fig. 5'' animation at right. After the hadrons in a neutron star's core begin decomposing and a nascent event horizon begins expanding, its radius shrinks by only about 500 meters during the first 125 milliseconds. However, this initial phase of the collapse is an extraordinarily energetic [[Thermodynamics|thermodynamic]] event, generating a peak internal temperature of 95 [[electronvolt|MeV]] (1.1 trillion [[kelvin]]). During this period, a {{solar mass|2.48}} neutron star emits a powerful burst of [[neutrino]]s with a total energy release of about {{val|9|e=51|}} [[erg]]s (equivalent to about {{val|1|e=28|u=kg}} per {{nowrap begin}}''E'' = ''mc''<sup>2</sup> ),{{nowrap end}} which radiates away 0.2 percent of the neutron star's mass.<ref name="Baumgarte">""[https://articles.adsabs.harvard.edu/pdf/1996ApJ...468..823B Delayed Collapse of Hot Neutron Stars to Black Holes via Hadronic Phase Transitions"], T.W. Baumgarte ''et al.'', ''The Astrophysical Journal'', (September 10, 1996) '''468''', pp. 823–833, {{nowrap|doi [https://ui.adsabs.harvard.edu/abs/1996ApJ...468..823B/abstract 10.1086/177738.]}} See §3.1 starting on page 827 through the first paragraph at the top of page 828 for a summary of collapse duration. Note also that the neutrino luminosity charts in the paper, such as their ''Fig. 9'' on page 830 and {{nowrap|''Fig. 10''}} on page 831 are, as clarified in the body text, per {{solar mass|0.1}}. Thus, the total neutrino luminosity averages {{val|2.8|e=51|u=ergs/s}} per {{solar mass|0.1}} for 125 ms. Temperature profiles for various radial depths and collapse times are shown in their ''Fig. 5'' on page 829.</ref> This is a virtually incomprehensible amount of power and energy equivalent to the near-simultaneous detonation of four million-billion-trillion [[Tsar Bomba]] hydrogen bombs (at 50 megatons, the largest ever tested). |
|||
Since hot neutron star matter is opaque to neutrinos, the exceedingly energetic neutrino emission process during a collapse, which is known as "deleptonization" (see ''[[Lepton]]''), powerfully opposes and retards the collapse progress. Soon though, relativistic effects due to the expanding internal event horizon overwhelm the collapse-opposing effects of deleptonization and the collapse rate dramatically accelerates. The vast majority of the neutron star's shrinkage occurs over the final 0.7 millisecond as the neutron star's surface accelerates from a near-stall and shoots downward to merge with the rapidly expanding event horizon. The instant before disappearing beneath the event horizon, the surface of the neutron star is moving at approximately half the speed of light and has a temperature of 6 MeV (70 billion kelvin).<ref name="Baumgarte" /> At only 0.7 millisecond, this final phase of collapse, which comprises 92 percent the length of the double-ended red arrow in ''Fig. 4'', is brief indeed; it is only about one-sixth the duration of a flash from a typical camera-mounted strobe-type speedlight on its maximum setting, which is about {{frac|1|250}}<small>th</small> of a second (~4 ms). |
|||
As shown in the ''Fig. 5'' animation, the collapse of a neutron star not only appears to be nearly instantaneous but also transforms it from one of the brightest whites in the Universe to the blackest possible black.<!-- |
|||
--><ref group="Note">[[File:CNRSblackhole.jpg|thumb|right|250px]]<!-- |
|||
-->That a black hole literally appears black is in a limited sense in this scenario since the newly formed black hole is a member of a binary pair where the precursor neutron star was siphoning stellar material from its companion. The newly formed black hole will consequently continue to be surrounded by an accretion disk. Black holes with accretion disks can be directly viewed only from certain angles above or below the plane of the accretion disk, as shown in the computer-generated image at right, which was produced at the Paris Observatory–Meudon (Observatoire de Paris–Meudon). Black holes that are not surrounded by accretion disks can be found at the center of supernova remnants (known as nebulae). However, the inherent nature of such stellar-mass black holes means it is virtually impossible to capture images of them so proving they exist is highly problematic. One supernova remnant suspected of harboring a stellar-mass black hole is [[W49B]]. More computer-generated images of black holes surrounded by accretion disks, which are superior to artist's renderings, can be viewed in a scientific paper by the Paris Observatory, "Seeing Black Holes: from the Computer to the Telescope" ([https://arxiv.org/pdf/1804.03909.pdf PDF]).</ref><!-- |
|||
--> While violent transient events such as those underlying [[gamma-ray burst]]s can briefly produce the hottest observable temperatures in the Universe, neutron stars can have the hottest surfaces for a continuously radiating stellar body.<ref>"[https://iopscience.iop.org/article/10.1088/0004-637X/702/2/1211/pdf Quasi-Blackbody Component and Radiative Efficiency of the Prompt Emission of Gamma-Ray Bursts"], Felix Ryde, ''The Astrophysical Journal'', '''702''', pp. 1211–1229 (September 10, 2009). The authors wrote the following regarding a particular gamma-ray burst "The thermal component is prominent and is the cause for the spectral peak, at an observed peak energy ''E''<sub>p</sub> ~ 250 keV." This equates to a temperature of 2.9 billion kelvin.</ref><ref>"[https://www.forbes.com/sites/startswithabang/2021/06/14/what-are-the-hottest-stars-in-the-universe/ What Are The Hottest Stars In The Universe?"]", Ethan Siegel, ''Forbes'' (Jun 14, 2021}</ref> Newly formed neutron stars may have surface temperatures of ten million kelvin or more. However, since neutron stars generate no new heat through fusion, they inexorably cool down after their formation. Consequently, a given neutron star reaches a surface temperature of one million kelvin when it is between one thousand and one million years old.<ref name="Chandra">"[https://Chandra.harvard.edu/resources/faq/sources/snr/snr-39.html Q&A: Supernova Remnants and Neutron Stars"], ''Chandra.harvard.edu'' (September 5, 2008)</ref> Older and even-cooler neutron stars are still easy to discover; the well-studied neutron star, {{nowrap|[[RX J1856.5−3754]],}} has an average surface temperature of about 434,000 kelvin.<ref>"Magnetic Hydrogen Atmosphere Models and the Neutron Star RX J1856.5−3754" ([https://arxiv.org/pdf/astro-ph/0612145v1.pdf PDF]), Wynn C. G. Ho ''et al.'', ''Monthly Notices of the Royal Astronomical Society'', '''375''', pp. 821-830 (2007), submitted December 6, 2006, [https://arxiv.org/abs/astro-ph/0612145v1 ArXiv:astro-ph/0612145]. The authors calculated what they considered to be "a more realistic model, which accounts for magnetic field and temperature variations over the neutron star surface as well as general relativistic effects," which yielded an average surface temperature of {{val|4.34|e=5|+0.02|-0.06|u=K}} at a confidence level of 2𝜎 (95%); see §4, ''Fig. 6'' in their paper for details.</ref> For comparison, the Sun has an effective surface temperature of 5,780 kelvin.<ref>"The Sun is less active than other solar-like stars" ([https://arxiv.org/pdf/2005.01401.pdf PDF]), Timo Reinhold ''et al''., ''ArXiv:astro-ph.SR'' (May 4, 2020) [https://arxiv.org/abs/2005.01401 ArXiv:2005.01401]</ref> |
|||
Though a neutron star with a surface temperature of one million kelvin emits the vast majority of its light at a peak wavelength of about 3 nanometers, which is in an electromagnetic band known as {{nowrap|''soft x-rays''}} (see ''[[Electromagnetic spectrum]]'' ), it still emits truly blinding amounts of bluish-white light in the range the human eye is sensitive to (380–750 nm). Specifically, compared to the Sun, the average square meter of the surface of a one-million-kelvin neutron star would appear several thousand times more luminous.<!-- |
|||
--><ref group="Note">The stated equivalency, "compared to the Sun, the average square meter of the surface of a one-million-kelvin neutron star would appear several thousand times more luminous," has sufficient precision. Moreover, the adjective "luminous" has a specific scientific meaning. In part, the relatively low precision of the equivalency is appropriate because it is based upon a low-precision neutron star temperature of one million kelvin and because any random population of neutron stars varies widely in temperature. More significantly though, to correctly calculate the relative luminosities of [[Black-body radiation|blackbody radiators]] with temperatures that are exceptionally different (a factor of 173:1 in this case), various technicalities must be addressed, such as the [[color temperature]] of light sources, how the human vision system responds to different wavelengths of light, and even how the human eye quickly adapts to different color temperatures. Without pinning down such details, the surface of a one-million-kelvin neutron star could be said to be anywhere from 3,140 to 4,880 times "brighter" than the Sun.<p><!-- |
|||
-->The color temperatures of the Sun (5,780 kelvin) and a one-million-kelvin neutron star are exceedingly different. The Sun is considered a slightly yellowish-white star, whereas the neutron star radiates primarily in soft x-rays (at a peak-power wavelength of 2.90 nm) and would appear bluish-white because it emits deep-violet (380 nm) light 15 times more intensely than deep-red (750 nm) light. These [[Spectral radiance|peak spectral radiances]] are {{nowrap|389,540,000 W/m<sup>2</sup>/sr/nm}} and {{nowrap|25,913,000 W/m<sup>2</sup>/sr/nm}}, respectively, which may be calculated using the following variant of [[Planck's law]] (with a final division by {{val|1|e=9}} to convert to nanometers):</p><!-- |
|||
--><math>B(\lambda, T) =\frac{2 hc^2}{\lambda^5} \frac{1}{ e^{h c/(\lambda k_\mathrm{B}T)} - 1 }</math><!-- |
|||
--><p>In comparison, the Sun outputs only 14% more deep-violet light than deep-red, not 15 times like the neutron star. When summed across the entire range of wavelengths the human eye is sensitive to {{nowrap|(380–750 nm),}} the neutron star—boosted in part by its outsized output in the violet end of the spectrum—would have an "in-band radiant exitance" that is 4,880 times more radiant per square meter than the Sun. This ratio compares the total power of light with wavelengths of {{nowrap|380–750 nm}} emitted from a given area of their respective surfaces. This range is well away from the wavelength at which a one-million-kelvin neutron star most intensely emits electromagnetic radiation ({{nowrap|soft x-rays}} at 2.90 nm) and which does so 155 billion times more intensely than what the Sun radiates at its peak spectral radiance wavelength of 501 nm. In the science of [[radiometry]], this property is called [[radiant exitance]] and the unit of measure is watts per square meter.</p><!-- |
|||
-->[[File:CIE 1931 Luminosity.png|right|thumb|290px|This is the CIE 1931 graph of the human eye's sensitivity to light at different wavelengths under well-lit conditions, with violet on the left and red on the right. The peak is at 555 nm, which appears green.]]<!-- |
|||
--><p>However, the human vision system would not perceive differences in luminosity between the surface of the Sun and a neutron star as scientific measurements of total in-band radiant output would. The human eye has a [[photopic vision|photopic response curve]] (bright-light spectral sensitivity, as shown at right) that makes it maximally sensitive to a specific type of green (555 nm) but which can only barely detect deep-violet and deep-red light (380 and 750 nm, respectively); the eye's relative insensitivity to light in the violet end of the spectrum would significantly undercut the neutron star's advantage over the Sun at shorter wavelengths. Measuring the brightness of light as it is ''visually perceived'' is the science of [[Photometry (optics)|photometry]], the property is [[Illuminance|luminous emittance]], and the unit of measure is the [[lux]] ([[Lumen (unit)|lumen]]s per square meter). When measured this way, using [[light meter]]s that respond like the human eye, the neutron star would appear only 3,330 times more ''luminous'' than the Sun instead of 4,880 times more ''radiant.''</p><!-- |
|||
--><p>Further complicating matters is a one-million-kelvin neutron star would appear to the human vision system as bluish-white ''only comparatively''—when side-by-side with a reference white—and only after one's eyes have first adapted to that reference white (see ''[[Chromatic adaptation]]'' and ''[[LMS color space]]''). Short of merely standing outside at around noontime when there is a cloudless and clear blue summer sky, whether a given reference light source is close to "white" is established via [[colorimetry]] measurements made with spectrometers ("color temperature" meters often used by photographers) calibrated to industry-standard [[Chromaticity|chromaticity coordinate standards]] ([[CIE 1931 color space|CIE 1931]] and [[CIELUV|CIE 1976]]).<p><!-- |
|||
--></p>However, the human eye rapidly adapts to different color temperatures when no competing light sources exist. The perception of "what is white" is partly determined by the way the visual system of the human mind works, which can be confused, particularly when light sources with different color temperatures are mixed and there are no unambiguously white objects or [[specular reflection]]s in the scene (see ''[[The dress]]''). But when directly viewing only a neutron star or when viewing typical and familiar environments illuminated solely by the light from a neutron star, the retina would adapt to produce what the vision system perceives as a balanced white. In doing so, the blue-sensitive [[Cone cell|cones]] would rapidly decrease in sensitivity (a phenomenon called ''bleaching'' or ''decrease in gain'') and the green-sensitive cones would bleach slightly less. Such bleaching begins almost instantly and is mainly responsible for [[Afterimage|afterimage-type optical illusions]]. The eye's red-sensitive cones, also called "long"-wavelength cones, would require no gain reduction relative to the green and blue cones to chromatically adapt to the light from the neutron star. When the spectral radiances of a one-million-kelvin neutron star and the Sun are measured at the peak-sensitivity wavelength of the red-sensitive (long wavelength) cones (a wavelength of 565 nm, per "A new transformation of cone responses to opponent color responses" ([https://www.ncbi.nlm.nih.gov/pmc/articles/PMC8084791/pdf/13414_2020_Article_2216.pdf PDF]), Ralph W. Pridmore, ''Perception, & Psychophysics'', (January 6, 2021) '''83''', pp. 1797–1803, ''Table 1'', which summarizes 31 color-vision studies conducted between 1955 and 2011), the surface of the neutron star is only 3,140 times more luminous per unit area than the Sun as perceived by eyes that have chromatically adapted to the neutron star, not 3,330 times as would be perceived during side-by-side comparisons to the Sun.</p><!-- |
|||
--><p>These biological complexities mean that calculating perceived differences in brightness to a precision greater than "several thousand" would require ponderous statements regarding the underlying assumptions lest the stated value be incorrect, misleading, or suffer from [[false precision]].</p></ref><!-- |
|||
--> If a one-million-kelvin neutron star, which is only about the size of a large city, were as far away from Earth as the Sun is, it would appear in the night sky as an unresolvable star-like point of light that is 2600 times brighter {{nowrap|(11{{frac|1|3}} [[f-number|f-stops]])}} than the brightest star in the sky, [[Sirius]] (the [[apparent magnitude]]s of the neutron star would be −10 whereas Sirius is −1.46).<ref name="Chandra" /> Such a neutron star would illuminate a nighttime landscape on Earth about as well as a half moon, which has an apparent magnitude of about −9.4. |
|||
=== Escape velocity === |
|||
{{multiple image |align=right |direction=vertical |width=350 |
|||
|image1=BH-no-escape-1.svg |caption1='''Figure 6 ''' Einstein's 1915 theory of general relativity established how gravity affects spacetime, as illustrated in these three panes depicting a type of [[Minkowski space|Minkowski]] [[spacetime diagram]]. Far away from a black hole, particles and photons can move in any direction, represented by the curvy arrows. The limiting rays at ±45° represent photons traveling directly leftwards and rightwards at the speed of light as time moves upwards at the speed of light. |
|||
|image2=BH-no-escape-2.svg |caption2=Close to an event horizon, photon paths not heading directly at the black hole are sheared to one extent or another to the right, and photons escaping the black hole lose energy and become [[redshift]]ed as they climb against gravity. Since "straight" is "the path taken by photons in a vacuum," mass that distorts photon paths distorts spacetime itself. |
|||
|image3=BH-no-escape-3.svg |caption3=At an event horizon—depicted here as inside the void surrounding a singularity—all photons have lost all energy (are infinitely redshifted) and none can escape. Moreover, no amount of force can lift away a particle possessing mass. Fuzzball theory holds that matter and photons collide with a physical surface precisely at the event horizon.}} |
|||
Irrespective of a fuzzball's mass, resultant mean density, or even its spin (which affects the Schwarzschild radius; see also ''[[Ergosphere]]'' and ''[[Rotating black hole]])'', its physical surface is located precisely at the event horizon, which is the threshold at which the escape velocity equals the speed of light: 299,792,458 meters per second. As its name suggests, ''escape velocity'' is the velocity a smaller body must achieve to escape from a much more massive one; at 11,186 m/s, Earth's escape velocity is only 3.7 thousandths of one percent that of event horizons. Thus, event horizons—those either surrounding singularities or the surface of fuzzballs—lie at the point where spacetime, as shown in ''Fig. 6'' at right, has been curved by gravity to the speed of light in accordance with general relativity.<!-- |
|||
--><ref group="Note">The warpage of space by mass is described in Einstein's second theory of relativity, later known as "general relativity," which includes the effects of accelerating frames of reference and gravity (another type of acceleration)—not his first theory of relativity (later known as "[[special relativity]]"). The theoretical physicist {{nowrap|[[John Archibald Wheeler|John A. Wheeler]],}} who was largely responsible for reviving interest in general relativity in the United States after World War II, wrote the following oft-cited summarization of general relativity: "Matter tells spacetime how to curve, and curved spacetime tells matter how to move." |
|||
[[File:Relativity of Simultaneity Animation.gif|thumb|190px|A Minkowski spacetime diagram illustrating special relativity]] |
|||
How these two theories ("special" and "general") were related, described the laws of nature, and eventually got their names (which describe their scope, or meaning) was an evolving, multi-year process as Einstein endeavored to incorporate the effects of gravity into a unified theory that correctly predicted observations for all observers in all frames of reference and enabled Karl Schwarzschild to precisely calculate the radius of event horizons. |
|||
Having authored or coauthored nearly 500 scientific journal papers (an average of one paper every six weeks) and 16 books over his 54-year-long career, Einstein was a prolific writer (see ''[[List of scientific publications by Albert Einstein]]''). In his 1905 paper, "[https://onlinelibrary.wiley.com/doi/epdf/10.1002/andp.19053221004 Zur Elektrodynamik bewegter Körper,"] published in a German scientific journal and later re-published in English as "On the Electrodynamics of Moving Bodies" [https://www.physics.umd.edu/courses/Phys606/spring_2011/einstein_electrodynamics_of_moving_bodies.pdf (PDF]), which would later be known as "special relativity," Einstein—as illustrated in the animation at right—established the following: |
|||
# The laws of physics are identical in all non-accelerating frames of reference, and |
|||
# The speed of light in a vacuum is the same for all observers, irrespective of the relative motion between the light source and observer. |
|||
Note that Einstein's famous formula regarding [[mass–energy equivalence]], {{math|1=''E'' = ''mc''<sup>2</sup>}}, as Einstein began writing the equation in the 1920s and which entered popular culture at the start of the post-World War II [[Atomic Age]], was neither part of his paper on special relativity nor general relativity; it was from a separate 1905 journal paper, "[https://onlinelibrary.wiley.com/doi/epdf/10.1002/andp.19053231314 Ist die Trägheit eines Körpers von seinem Energieinhalt abhängig?]" ("Does the Inertia of a Body Depend upon its Energy-Content?"). In that paper, Einstein originally expressed the equivalency partly in prose by writing (when translated to English), "{{math|1=If}} {{math|1=a}} {{math|1=body}} {{math|1=gives}} {{math|1=off}} {{math|1=the}} {{math|1=energy}} {{math|1=''L''}} {{math|1=in}} {{math|1=the}} {{math|1=form}} {{math|1=of}} {{math|1=radiation,}} {{math|1=its}} {{math|1=mass}} {{math|1=diminishes}} {{math|1=by}} {{math|1=''L''/''V''<sup>2</sup>}}." Note Einstein's early use of {{math|1=''L''}} instead {{nowrap|of {{math|1=''E''}}}} as the symbol for energy and {{math|1=''V''}} instead {{nowrap|of {{math|1=''c''}}}} as the symbol for the velocity of light, which could be expressed entirely symbolically as {{math|1=''m'' = ''L''/''V''<sup>2</sup>}} and {{math|1=''L'' = ''mV''<sup>2</sup>}}. |
|||
Einstein's 1914 paper, "Die Formale Grundlage der allgemeinen Relativitätstheorie" (known as "[https://en.wikisource.org/wiki/The_Foundation_of_the_Generalised_Theory_of_Relativity The Foundation of the Generalised Theory of Relativity]") was the first to mention the term "General Theory" and refer to his previous theory as "Special Relativity theory". From the preamble of the paper: |
|||
{{Quote frame|The theory which is sketched in the following pages forms the most wide-going generalization conceivable of what is at present known as "the theory of Relativity;" this latter theory I differentiate from the former "Special Relativity theory", and suppose it to be known.|width=70%|align=center}} |
|||
In 1916, Einstein expanded upon general relativity and tied it together with special relativity in the German-language paper, "Die Grundlage der allgemeinen Relativitätstheorie," ("Relativity: The Special and the General Theory"), which constituted 54 pages in the German-language physics journal, ''[[Annalen der Physik]]'' (''Annals of Physics''), Volume 354, Issue 7. A 2.4 MB downloadable and searchable German-language PDF is available [https://onlinelibrary.wiley.com/doi/epdf/10.1002/andp.19163540702 here at Wiley Online Library.] |
|||
Later, Einstein, in collaboration with the British physicist [[Robert W. Lawson]] who translated Einstein's works, further expanded upon his 1916 journal paper and consolidated his theories into an English-language hard-cover book given the same title as the paper. Two versions—with different forewords by Lawson on the dust jackets—were published in 1920: 1) In the U.S., as a 182-page (168 numbered body pages) book titled "[[Relativity: The Special and the General Theory]]," by Henry Holt and Company, New York; and 2) In England with a 138-page printing titled "Relativity: The Special and the General Theory. A Popular Exposition," by Methuen & Co., Ltd, London. |
|||
In the book, Einstein explained the basis for referring to his first theory ("On the Electrodynamics of Moving Bodies") as "special relativity"; it was valid only for a particular, or special, subset of reference frames (non-accelerating ones). Einstein had been striving for a unified theory applicable to all observers, regardless of whether they were in an inertial or accelerating frame of reference. Such a unified theory would, in Einstein's view, have the virtue of being compliant with an all-encompassing universal law of nature. The German adjective "allgemeinen," (in "Die Grundlage der allgemeinen Relativitätstheorie," or "Relativity: The Special and the General Theory") translates to "general" but has a subtly different meaning than in English technical writing where it commonly connotes "broad but not necessarily specific". The word "allgemeinen" is a [[German declension|declension]] of the root adjective "allgemein" (a close pronunciation for English-only speakers is ''{{nowrap|'''I'll'''・guh・mine}}'', where the syllable ''I'll'' is pronounced like the contraction for "I will"), which has multiple context-sensitive connotations in German, one of which—especially in technical matters—means "universal." The following is from his 1920 book, "Relativity: The Special and the General Theory": |
|||
{{Quote frame|The validity of the principle of relativity was assumed only for these reference-bodies, but not for others (e.g. those possessing motion of a different kind). In this sense we speak of the special principle of relativity, or special theory of relativity.<p>.... </p><p>Or, in brief: General laws of nature are co-variant with respect to Lorentz transformations.</p><p>This is a definite mathematical condition that the theory of relativity demands of a natural law, and in virtue of this, the theory becomes a valuable heuristic aid in the search for general laws of nature. If a general law of nature were to be found...</p>|width=70%|align=center}}</ref> |
|||
=== Gravitational acceleration === |
|||
Note that ''escape velocity'', which has the unit of measure m/s, is distinct from ''gravitational strength'', which is a different property known as ''[[acceleration]]'' and has m/s<sup>2</sup> as its unit of measure. Though the escape velocity at an event horizon is a finite value (the speed of light), the gravitational strength at event horizons (and the surface of theorized fuzzballs) is infinite, imbuing particles possessing any mass whatsoever with infinite weight.<!-- |
|||
EDITORS NOTE FOR Wikipedians: Numerous websites (online discussion groups and even well-respected websites like Quanta Magazine https://www.quantamagazine.org/new-calculations-show-how-to-escape-hawkings-black-hole-paradox-20230802/) incorrectly state that the gravitational strength at the event horizon of a supermassive black hole can be quite modest. This notion is not only wrong, it reinforces John F. Kennedy's observation that "Too often we enjoy the comfort of opinion without the discomfort of thought." There is even a YouTube video (https://www.youtube.com/watch?v=b6hccO2WYnc&t=61s) of a mathematician calculating the weight of someone at an event horizon, where he proudly and improperly shows on a blackboard how he is using Newton's formula for gravitation… there is no general relativity in sight. |
|||
[CONTINUED]: Though supermassive black holes can have low gravitational tides that won't spaghettify an astronaut and can have very low average densities, by definition, the event horizon demarcates the threshold at which even a photon can't escape upwards against the gravitational well. If a supermassive black hole had a gravitational strength at its event horizon that was only about as strong as Earth (as stated in Quanta Magazine), then not only could light escape, but so too a modest rocket. In a nutshell: The *escape velocity* equals the speed of light at an event horizon and equals infinity at a singularity. *Gravitational strength* is infinite at an event horizon and is undefined (beyond physics) below that, including at a singularity. This distinction (between escape velocity vs. acceleration) is hard to cite because there is a huge gulf between the original scientific papers and popular understanding. |
|||
END OF NOTE |
|||
--> Thus, an imaginary uncrushable rocket with its center of mass located at an event horizon would require infinite thrust to merely hover.<ref name="Vttoth">Vttoth.com: [https://www.vttoth.com/CMS/physics-notes/311-hawking-radiation-calculator Hawking radiation calculator]</ref> This is general relativity's "accelerating frame of reference" counterpart to [[special relativity]]'s requirement that infinite energy is required to accelerate an object possessing mass—even a subatomic particle—to precisely the speed of light. |
|||
This property of infinite gravitational acceleration (infinite gravitational strength) at event horizons merits further scrutiny because at least as recently as 2023, online popular culture sites such as physics discussion boards, science websites, and even a university physics professor on YouTube writing calculations on a blackboard were promulgating a misunderstanding that objects have non-infinite weights at event horizons. The root cause of some of this misunderstanding was the improper application of [[Isaac Newton]]'s {{age|1687|1|5}}-year-old<!--THIS DATE IS PURPOSELY 6 MONTHS AHEAD TO ROUND IT TO THE NEAREST HALF-YEAR AND TO MAKE THE MATH INTUITIVE WHEN MENTALLY PERFORMING MATH IN WHOLE YEARS--> formula for the [[Newton's law of universal gravitation|law of universal gravitation]] (upper equation, below) rather than a proper appreciation of the ramifications of Einstein's theory of general relativity and how extreme gravity affects spacetime. Such a mistake is born of a logical non sequitur that while general relativity explains the ''existence'' of an event horizon around a black hole, that event horizon somehow remains part of regular un-warped spacetime where Newton's law of universal gravitation applies; it does not. In accordance with general relativity (lower equation, below), event horizons exist ''because'' their escape velocity equals the speed of light and gravitational acceleration is infinite, completely cutting them off from spacetime; no further calculations are warranted. |
|||
:* Newton's law of universal gravitation: <math>F=G\frac{m_1m_2}{r^2}</math> |
|||
:* Schwarzschild radius: <math>R=\frac{2GM}{c^{2}}</math> |
|||
Newton's law of universal gravitation yields increasingly inaccurate results as both space and time (spacetime) are increasingly warped by large masses. Even in the mildly gravitationally warped spacetime surrounding Earth, [[Error analysis for the Global Positioning System#Relativity|general relativity's gravitational effect on GPS satellites]] makes their onboard atomic clocks run 45,685 nanoseconds per day (0.01669 second per year) faster when in orbit versus their [[Earth-centered, Earth-fixed coordinate system|Earth-centered reference location]], 26,562 kilometers below.<!-- |
|||
--><ref>[https://citeseerx.ist.psu.edu/document?repid=rep1&type=pdf&doi=98a137344033442e111007bf354800f76f33ccdc "Effects of the Theory of Relativity in the GPS"], Mario Haustein, Chemnitz University of Technology, equation 19 p. 9, (February 25, 2009)</ref><!-- |
|||
--> To make GPS timing signals run at the slower center-of-Earth rate while in orbit, the satellites' reference oscillators receive a "factory offset" before launch, which also compensates for a smaller opposing effect of special relativity due to orbital velocity. At the other extreme, the improper use of Newton's formula to calculate the gravitational strength at the event horizon of the largest known supermassive black hole, Phoenix A* (see ''[[List of most massive black holes]]''), which is estimated to be {{Solar mass|100 billion}}, yields a wildly incorrect (and even survivable) gravitational acceleration of only about 15 times that of Earth's gravity.<ref name="Vttoth" /> Regardless of the size of a black hole, from the perspective of an observer outside a black hole's gravitational influence, the escape velocity at event horizons and the surface of fuzzballs equals the speed of light, gravitational strength is infinite, and the flow of time has come to a halt. |
|||
=== Gravitational tides === |
|||
The aforementioned phenomenon of infinite gravitational acceleration at event horizons is distinct from ''[[gradient]]s'' known as [[Tidal force|gravitational tides]]. The intense gravitational tides of stellar-mass black holes, [[intermediate-mass black hole]]s, and smaller supermassive black holes cause a stretching effect on objects known as [[spaghettification]], lethal amounts of which can occur hundreds of kilometers above the surface of stellar-mass fuzzballs (or above the event horizon surrounding a singularity). For instance, a 10 {{solar mass}} stellar-class fuzzball has a gravitational tide at its surface of 100 billion Earth-gravities per meter, which would stretch an infalling astronaut into a stream of paste well before reaching its surface.<ref name="Vttoth" /> Even a relatively small 400,000 {{solar mass}} supermassive fuzzball, which has a gravitational tide of 64 Earth-gravities per meter at its surface, would pull apart the body of a hapless astronaut falling feet-first before reaching its surface due to vertebral tensile forces greater than the weight of one metric ton<!-- EDITORS NOTE: |
|||
WIKIPEDIA IS A →GENERAL-INTEREST← ENCYCLOPEDIA DIRECTED TO A DIVERSE READERSHIP THAT IS OFTEN ONLY SEMI-TECHNICAL——EVEN WHEN VISITING AN ARTICLE LIKE THIS. THE STATED EQUIVALENCY (IN PLACE OF A UNIT OF MEASURE), “equivalent to the weight of over a metric ton on Earth”, is SI-COMPLIANT AND TRUE. MUCH MORE IMPORTANT, IT IS WIDELY ACCESSIBLE. PLEASE DON’T SUBSTITUTE “newtons” OR——WORSE YET——THE UNIT SYMBOL “N” BECAUSE DOING SO IS SUPER-“SCIENCY”. FAR TOO FEW PEOPLE CAN INTUIT WHAT “over 9800 N” MEANS. {By User Greg L on Sept. 11, 2023}--> on Earth.<ref name="Vttoth" /> |
|||
== Information paradox == |
== Information paradox == |
||
{{Main|Black hole information paradox}} |
{{Main|Black hole information paradox}} |
||
[[File:Charcoal and smoke, crop.jpg|thumb|350px|'''Figure 7 ''' When charcoal briquettes burn, they react with oxygen from their surroundings to produce gasses, smoke particles, photons, and kinetic heat energy. Burning profoundly scrambles the quantum information composing this briquettes / surroundings system, making its [[wave function]] altogether different. Although perturbations to wave functions are [[Time reversibility|time reversible]] in a very narrow theoretical sense (by imagining one could acquire perfect knowledge of every quantum perturbation without disturbing them and subtract those changes in reverse order), it is impossible in the full theoretical sense to deduce the original nature of the briquettes / surroundings system. Importantly, although burning irrevocably scrambles the quantum information, none is destroyed, abiding by a law of quantum mechanics requiring that it be conserved.</p><p>The conservation of quantum information is analogous to taking a digital [[High Efficiency Video Coding|MPEG movie]] file saved with [[lossless compression]] (a proxy for a [[Isolated system|perfectly isolated system]] saturated with random quantum information) and then [[Advanced Encryption Standard|encrypting]] it without knowing the cipher key (a proxy for the impossibility of reconstructing an original wave function, which is in accordance with the [[Born rule]] requiring that random quantum activity in nature cannot be perfectly known because measurements of it [[Measurement in quantum mechanics|are probabilistic]], as well as because the very act of making such measurements [[Observer effect (physics)|affects the outcomes]]): Though the encrypted file is irreversibly scrambled, the sizes of the two files are the same and so too their [[information content]].</p>]] |
|||
Classical black holes create a problem for physics known as the ''black hole information paradox''; there is no such paradox under fuzzball theory. The paradox was first raised in 1972 by [[Jacob Bekenstein]] and later popularized by [[Stephen Hawking]]. The information paradox is born of a requirement of quantum mechanics that quantum information ''must be conserved'', which conflicts with general relativity's requirement that if black holes have singularities at their centers, quantum information ''must be extinguished'' from spacetime. This paradox can be viewed as a contradiction between two very different theories: general relativity, which describes the largest gravity-based phenomena in the Universe, and quantum mechanics, which describes the smallest phenomena. Fuzzball theory purports to resolve this tension because the Type IIB superstring theory it is based on is a quantum description of gravity called [[supergravity]]. |
Classical black holes create a problem for physics known as the ''black hole information paradox''; there is no such paradox under fuzzball theory. The paradox was first raised in 1972 by [[Jacob Bekenstein]] and later popularized by [[Stephen Hawking]]. The information paradox is born of a requirement of quantum mechanics that quantum information ''must be conserved'', which conflicts with general relativity's requirement that if black holes have singularities at their centers, quantum information ''must be extinguished'' from spacetime. This paradox can be viewed as a contradiction between two very different theories: general relativity, which describes the largest gravity-based phenomena in the Universe, and quantum mechanics, which describes the smallest phenomena. Fuzzball theory purports to resolve this tension because the Type IIB superstring theory it is based on is a quantum description of gravity called [[supergravity]]. |
||
Line 229: | Line 102: | ||
-->One member of a virtual particle pair possesses negative [[Mass–energy equivalence|mass-energy]] (in the absolute {{nowrap begin}}''E'' = ''mc''<sup>2</sup>{{nowrap end}} sense), the other has positive mass-energy, and the average pair's net energy is zero.<ref>{{Cite book |last=Peskin |first=Michael E. |date=2018-05-04 |title=An Introduction To Quantum Field Theory |url=http://dx.doi.org/10.1201/9780429503559 |doi=10.1201/9780429503559|isbn=978-0-429-97210-2}}</ref><!-- |
-->One member of a virtual particle pair possesses negative [[Mass–energy equivalence|mass-energy]] (in the absolute {{nowrap begin}}''E'' = ''mc''<sup>2</sup>{{nowrap end}} sense), the other has positive mass-energy, and the average pair's net energy is zero.<ref>{{Cite book |last=Peskin |first=Michael E. |date=2018-05-04 |title=An Introduction To Quantum Field Theory |url=http://dx.doi.org/10.1201/9780429503559 |doi=10.1201/9780429503559|isbn=978-0-429-97210-2}}</ref><!-- |
||
--><ref group="Note">The meanings of "negative mass-energy” or simply "negative energy" (in the absolute {{nowrap begin}}''E'' = ''mc''<sup>2</sup>{{nowrap end}} sense) in discussions of [[virtual photon]]s at black holes, differ somewhat from what "negative energy" normally means for virtual photons in the lab (in regular spacetime). Virtual photons are oscillations in the background electromagnetic field that prevent an otherwise pure vacuum from containing (possessing) zero energy. Virtual photons are characterized by their [[Electromagnetic spectrum|wavelength]] (frequency, or "color"), [[Photon#Relativistic energy and momentum|momentum]] (which, unlike real photons, is exceedingly variable), and [[Photon polarization|polarization]] ([[Spin angular momentum of light|spin-angular momentum]]).</p><p><!-- |
|||
-->Unfortunately, terms like "negative energy," "antiparticle," and "antimatter" can add confusion to a topic that has long fallen victim to popular misunderstanding. Moreover, the issue of whether photons are best described as "waves" or "particles" can needlessly belabor a simple and accessible exposition on Hawking radiation if not formally addressed. Accordingly, a short treatise on the broad subject is required to establish context for how Hawking radiation can be viewed as "arising from virtual photons possessing negative energy tunneling through an event horizon."</p><p><!-- |
|||
-->The ''"[[wave–particle duality]]"'' adds complexity to a topic that is already challenging to understand. This duality is commonly encountered when photons are referred to as "quantized wave packets propagating in the electromagnetic field" rather than simply "particles." Referring to photons as "particles" more accurately and conveniently describes the nature of photons after they hit a light detector in a [[double-slit experiment]]; it is needlessly ponderous to say, "the photon's [[Wave function collapse|wave function then collapses]] to a point." Especially in a treatise on Hawking radiation, where Hawking himself wrote, "there will be pairs of particles, one with negative energy and one with positive energy," it is useful here to use particle-based vernacular. Nonetheless, the wave nature of virtual photons must be addressed to properly cover Hawking radiation.</p><p><!-- |
|||
-->Though one member of a pair of virtual photons can possess negative energy, this is neither the product of [[C-symmetry|charge conjugation]] (the reversing of electric charge as permitted by {{nowrap|"C-symmetry"),}} nor is it [[antimatter]] because, by definition, antimatter is "[[matter]] (which has mass) possessing an electric charge opposite that of ordinary matter." Though photons are considered to be their own [[antiparticle]] (which is a broad family that confusingly includes antimatter like [[antiproton]]s), photons are more specifically a ''[[Truly neutral particle|truly neutral particle / antiparticle]]''. Furthermore, real photons must always possess energy equal to the speed of light times their momentum vector and must have zero [[Massless particle|rest mass]].</p><p><!-- |
|||
-->In laboratories, virtual photons possess different kinds of momentum and interact with matter and its accompanying electromagnetic fields in different ways. Virtual photons exist everywhere and their effects are observable as the [[Lamb shift]] as they interact with the electromagnetic field of electrons surrounding atoms. This activity also underlies [[zero-point energy]], which jostles matter to such an extent it [[Thermodynamic temperature#Internal energy at absolute zero|prevents helium at near-absolute zero from freezing]] at room pressure. Virtual photons are also responsible for the [[Casimir effect]], which squeezes two closely spaced plates together. Virtual photons can also be polarized; this is to say, they have the quantum property of spin-angular momentum, which can [[Angular momentum coupling|couple to the angular momentum]] of charged particles.</p><p><!-- |
|||
-->In simple terms, all three of the above effects: the Lamb shift, the Casimir force, and the inability of helium to freeze at room pressure due to zero-point energy, arise from the collective activity of virtual photons. More precisely—and ponderously—these three effects result from oscillations in the [[Quantum electrodynamics|quantum electrodynamic field]], resulting in a non-zero [[QED vacuum]] (or simply ''[[vacuum energy]]''). The QED vacuum is the lowest energy state of ''the'' all-pervasive [[electromagnetic field]] permeating the Universe; real photons are traveling excitations in this electromagnetic field. Note that the ''quantum electrodynamic field'' and the ''electromagnetic field'' are essentially the same thing except that the former is the quantum-based view of electromagnetism that accounts for a non-zero vacuum energy. Note also that in discussions of Hawking radiation, the term "zero-point energy" is interchangeable in practice with "vacuum energy," but the former is broader and encompasses other zero-point fields, including the [[QCD vacuum|quantum chromodynamic vacuum]] (QCD), which governs interactions at the [[quark]] level.</p><p><!-- |
|||
--></p>[[File:QED oscillation, anotated.jpg|thumb|335px|This is a wave-based view showing the momentum disturbance of a single oscillation in the quantum electrodynamic (QED) field, also known as "a pair of virtual photons" in a particle-based view. These are the source of the photons constituting Hawking radiation.</p><p><!-- |
|||
-->Here, the 3D QED field that permeates the Universe is projected onto a 2D plane and the vertical axis represents the vector momentum, {{math|1='''p'''}} in an absolute (relativistic) sense. The upper and lower bulges represent virtual photons possessing positive and negative relativistic energy, respectively. This oscillation has no spin-angular momentum (polarization), which would appear as helical twists. The diameter of the oscillation is its wavelength, <math>{\lambda}</math> (lambda), which cannot factor into the energy of oscillations possessing zero net momentum.</p><p><!-- |
|||
-->A single oscillation in the QED field (the quantum version of the electromagnetic field) comprises momentum components that are, on average—but by no means always—equal and opposite. Consequently, the average net relativistic mass-energy of these oscillations is zero. QED oscillations last one complete cycle of their wavelength, so one with a wavelength of 600 nanometers (orange for real photons) exists for only about two [[femtosecond]]s.</p><p><!-- |
|||
-->Zero-point energy comprises oscillations in all types of quantum fields and is the subject of ongoing research in theoretical physics. In part, zero-point energy arises from the Heisenberg uncertainty principle's effect on QED vacuum energy, allowing for non-symmetrical virtual photon momenta (asymmetric bulges). Thus, some oscillations in the QED field possess non-zero net momentum and non-zero net relativistic mass-energy before quickly vanishing. While momentum asymmetries contribute to vacuum energy, they are not required to produce Hawking radiation.</p>]]<!-- |
|||
-->The [[Photon#Relativistic energy and momentum|relativistic mass-energy]] of ''real'' photons (their absolute {{nowrap begin}}''E'' = ''mc''<sup>2</sup>{{nowrap end}} energy that, as Hawking wrote, is "relative to infinity") is proportional to their momentum vector times the speed of light per {{math|1=''E'' = '''p'''''c''}}, where…</p> |
|||
:{{math|1=''E''}} is energy, |
|||
:{{math|1='''p'''}} is the magnitude of the momentum vector<!-- (vector quantities are properly in bold roman typestyle)-->, and |
|||
:{{math|''c''}} is the speed of light. |
|||
<!-- |
|||
-->''Individual virtual'' photons are different from real ones; they may carry any momentum, or relativistic mass-energy, permitted by the [[Uncertainty principle|Heisenberg uncertainty principle]]. Thus, any given pair of virtual photons may possess opposite and ''unequal'' momenta. However, across a large population of virtual photon pairs, their net momentum averages to zero and so too does their [[Mass–energy equivalence|rest mass-energy]] and relativistic energy.</p><p><!-- |
|||
-->With regard to measurements in the lab of virtual photon momentum, the labels "positive energy" and "negative energy" are ''relative classifications'' established by the direction of their momentum vector, '''p''' (and accompanying energy) in relation to an external electromagnetic field (from one or more nearby charged particles). This convention comes from the behavior of real photons, which possess positive energy with respect to electrons; this underlies [[spectral line]]s where the electrons surrounding atoms transition from a lower-energy [[atomic orbital]] to a higher-energy one after absorbing photons. When an individual ''virtual'' photon is exchanged between two particles with like charges (followed soon after by its partner), it is considered to have positive energy when its momentum adds energy to the electromagnetic force between them and they more vigorously repel each other. Note that a virtual photon with a positive-energy momentum direction when exchanged between two electrons would be classified as possessing a ''negative-energy'' momentum if the exchange was between [[positron]]s.</p><p><!-- |
|||
-->In the context of Hawking radiation, however, the labels "positive energy" and "negative energy" for virtual photons are in an ''absolute sense'', or "relative to infinity," as Hawking wrote. Virtual photons with negative mass-energies in an absolute sense are generally considered as ''not physically real''. This is because a virtual photon possessing positive momentum and positive mass-energy behaves just like easy-to-study real photons, whereas a virtual photon possessing negative momentum and negative mass-energy cannot be isolated in the lab and its distinctive property studied. This inability to isolate a virtual photon possessing negative energy is to be expected since, in the wave-based view, it is actually an integral part of an individual oscillation in the quantum electrodynamic field (electromagnetic field) permeating the Universe (see image at right) that humans cannot bifurcate.</p><p><!-- |
|||
-->Black holes have the unique ability to do what cannot be done in the lab: separate virtual photon pairs; Hawking was clear about this in his paper. In Mathur's scientific paper, ''The fuzzball proposal for black holes: an elementary review'' ([https://arxiv.org/pdf/hep-th/0502050.pdf PDF]), he endeavored to explain in greater detail the mechanism that allows the quantum information describing what fell into a black hole to be imprinted in Hawking radiation. Mathur wrote that since the radius of curvature near supermassive black holes is larger than both the Planck length and the size of strings, supermassive black holes would seemingly be incapable of violating Hawking’s argument; i.e., such holes would continuously separate virtual photon pairs, creating a problem for quantum theory. Mathur posited that the problem is resolved in the following way: "Bound states" (oscillations in quantum fields like the QED field) grow larger with increasing "[[Degenerate energy levels|degeneracy]]"; which is to say, spacetime and gravity near event horizons are so agitated that different quantum states begin to share the same energy levels. Essentially, near event horizons where spacetime is close to no longer existing, the quantum property of size smears, enlarges, and overlaps with other quantum properties. This changes the structure of the black hole from what Hawking had imagined to something more like a "string star." A string star does not separate photon pairs like a traditional black hole does, and thus, Hawking’s puzzle is resolved.</p><p><!-- |
|||
-->From the perspective of an outside observer viewing ''wave-based'' phenomena, black holes can shear, stretch, and bifurcate the components of a QED oscillation possessing opposite momenta. Hawking radiation arises when the portion of the oscillation possessing negative momentum and negative relativistic mass-energy (the lower bulge of the QED oscillation at right) tunnels through to a black hole. This liberates the positive-energy half of the QED oscillation as a real photon, which becomes exceedingly [[Gravitational redshift|gravitationally redshifted]] as it climbs up the extreme gravity well surrounding the black hole and escapes to infinity. The peak-emission wavelength of fully redshifted photons is about ten times the diameter of the event horizon surrounding a non-spinning black hole regardless of its mass; a 6.77 {{solar mass}} non-spinning black hole with an event horizon diameter of 40.0 kilometers emits Hawking radiation where the most common photons have a wavelength of 403 kilometers.</p><p><!-- |
|||
-->Finally, it is important to bear in mind that gravity and spacetime are so agitated near a black hole that even the mathematics describing Hawking radiation can be viewed in different ways. For instance, instead of negative-energy particles tunneling through the horizon in forward-directed time, they can be thought of, as Hawking wrote in his paper, "as positive-energy particles crossing the horizon on past-directed world-lines." As mentioned earlier, Hawking cautioned, "It should be emphasized that the mechanism responsible for the thermal emission and area decrease are heuristic only and should not be taken too literally." Even the basic premise that Hawking radiation is the product of a stationary person observing a highly accelerating region of spacetime has its general relativity inverse known as the [[Unruh effect]], which predicts that thermal radiation surrounds an accelerating observer. A helpful YouTube video, "[https://www.youtube.com/watch?v=isezfMo8kWQ Hawking radiation"] by ''ScienceClic English'', provides a very visual and detailed explanation of virtual particles, Hawking radiation, and how there are different ways of looking at these phenomena.</p></ref> <!-- |
|||
-->The virtual photon possessing negative energy is captured; it travels down through the event horizon via [[quantum tunneling]], whereupon it becomes part of the black hole (robbing it of energy and an [[Mass–energy equivalence|equivalent amount of mass]]). Meanwhile, the pair member with positive energy is ejected, carrying away its share of energy from the black hole; this is Hawking radiation, wherein the ejected photons are no longer virtual and are real. |
-->The virtual photon possessing negative energy is captured; it travels down through the event horizon via [[quantum tunneling]], whereupon it becomes part of the black hole (robbing it of energy and an [[Mass–energy equivalence|equivalent amount of mass]]). Meanwhile, the pair member with positive energy is ejected, carrying away its share of energy from the black hole; this is Hawking radiation, wherein the ejected photons are no longer virtual and are real. |
Revision as of 08:48, 4 December 2023
String theory |
---|
Fundamental objects |
Perturbative theory |
Non-perturbative results |
Phenomenology |
Mathematics |
Fuzzballs are a hypothetical object in superstring theory, intended to provide a fully quantum description of the black holes predicted by general relativity.
Fuzzball theory dispenses with the singularity at the heart of a black hole by positing that the entire region within the black hole's event horizon is actually an extended object: a ball of strings, which are advanced as the ultimate building blocks of matter and light. Under string theory, strings are bundles of energy vibrating in complex ways in both the three physical dimensions of space as well as in compact directions—extra dimensions interwoven in the quantum foam (see Fig. 2 and Fig. 8, below).[1]
Fuzzballs provide resolutions to two major open problems in black hole physics:
- They avoid the gravitational singularity that exists within the event horizon of a black hole. General relativity predicts that at the singularity, the curvature of spacetime becomes infinite, and it cannot determine the fate of matter and energy that falls into it. Physicists generally believe that the singularity is not a real phenomenon, and proposed theories of quantum gravity, such as superstring theory, are expected to explain its true nature.[2]
- It resolves the black hole information paradox: the quantum information of matter falling into a black hole is trapped behind the event horizon, and seems to disappear from the universe entirely when the black hole evaporates due to Hawking radiation. This would violate a fundamental law of quantum mechanics requiring that quantum information be conserved.[1][3]
As no direct experimental evidence supports either string theory or fuzzball theory, both are products purely of calculations and theoretical research.[4] However, the existence of fuzzballs may be testable through gravitational-wave astronomy.[5]
Physical properties
String theory and composition
Samir D. Mathur of The Ohio State University published eight scientific papers between 2001 and 2012, assisted by postdoctoral researcher Oleg Lunin, who contributed to the first two papers. The papers propose that black holes are sphere-like extended objects with a definite volume and are composed of strings.[6] This differs from the classic view of black holes in which there is a singularity at their centers (see Fig. 1 ), which are thought to be a zero-dimensional, zero-volume point in which the entire mass of a black hole is concentrated at infinite density, surrounded many kilometers away by an event horizon below which light cannot escape.
All variations of string theory hold that the fundamental constituents of subatomic particles, including the force carriers (e.g., photons and gluons), are actually strings of energy that take on their identities and respective masses by vibrating in different modes and frequencies. Fuzzball theory is rooted in a particular variant of superstring theory called Type IIB (see also String duality ), which holds that strings are both "open" (double-ended entities) and "closed" (looped entities) and that there are 9 + 1 spacetime dimensions wherein five of the six extra spatial dimensions are "compactified" (see Fig. 2 ).[7]
Unlike the view of a black hole as a singularity, a small fuzzball can be thought of as an extra-dense neutron star in which the neutrons have undergone a phase transition and decomposed, liberating the quarks (strings in string theory) comprising them. Accordingly, fuzzballs are theorized to be the terminal phase of degenerate matter. Mathur calculated that the physical surfaces of fuzzballs have radii equal to that of the event horizon of classic black holes; thus, the Schwarzschild radius of a ubiquitous 6.8 solar mass (M☉) stellar-mass-class black hole—or fuzzball—is 20 kilometers when the effects of spin are excluded. He also determined that the event horizon of a fuzzball would, at a very tiny scale (likely on the order of a few Planck lengths), be very much like a mist: fuzzy, hence the name "fuzzball."
With classical-model black holes, objects passing through the event horizon on their way to the singularity are thought to enter a realm of curved spacetime where the escape velocity exceeds the speed of light—a realm devoid of all structure. Moreover, precisely at the singularity—the heart of a classic black hole—spacetime itself is thought to break down catastrophically since infinite density demands infinite escape velocity; such conditions are problematic with known physics. Under the fuzzball theory, however, the strings comprising matter and photons are believed to fall onto and absorb into the fuzzball's surface, which is located at the event horizon—the threshold at which the escape velocity has achieved the speed of light.
A fuzzball is a black hole; spacetime, photons, and all else not exquisitely close to the surface of a fuzzball are thought to be affected in precisely the same fashion as with the classical model of black holes featuring a singularity at its center. The two theories diverge only at the quantum level; that is, classic black holes and fuzzballs differ only in their internal composition and how they affect virtual particles that form close to their event horizons (see § Information paradox, below). Fuzzball theory is thought by its proponents to be the true quantum description of black holes.
Densities
Fuzzballs become less dense as their mass increases due to fractional tension. When matter or energy (strings) fall onto a fuzzball, more strings are not simply added to the fuzzball; strings fuse, or join together. In doing so, all the quantum information of the in‑falling strings becomes part of larger, more complex strings. Due to fractional tension, string tension exponentially decreases as they become more complex with more vibration modes, relaxing to considerable lengths. The string theory formulas of Mathur and Lunin produce fuzzball surface radii that precisely equal Schwarzschild radii, which Karl Schwarzschild calculated using an entirely different mathematical technique 87 years earlier.[8]
Since the volume of fuzzballs is a function of the Schwarzschild radius (2953 meters per M☉ for a non-rotating black hole), fuzzballs have a variable density that decreases as the inverse square of their mass (twice the mass is twice the diameter, which is eight times the volume, resulting in one-quarter the density). A typical 6.8 M☉ fuzzball would have a mean density of 4.0×1017 kg/m3. This is an average, or mean, bulk density; as with neutron stars, the Sun, and its planets, a fuzzball's density varies from the surface where it is less dense, to its center where it is most dense. A bit of such a non-spinning fuzzball the size of a drop of water would, on average, have a mass of twenty million metric tons, which is equivalent to that of a granite ball 243 meters in diameter (Fig. 3 ).[Note 1]
Though such densities are almost unimaginably extreme, they are, mathematically speaking, infinitely far from infinite density. Although the densities of typical stellar-mass fuzzballs are extreme—about the same as neutron stars—their densities are many orders of magnitude less than the Planck density (5.155×1096 kg/m3), which is equivalent to the mass of the universe packed into the volume of a single atomic nucleus.
As can be seen below in Fig. 4, since the mean densities of fuzzballs (and the effective densities of classic black holes) decrease as the inverse square of their mass, fuzzballs greater than 7 M☉ are actually less dense than neutron stars possessing the minimum possible density. Due to the mass-density inverse-square rule, fuzzballs need not even have unimaginable densities. Supermassive black holes, which are found at the center of virtually all galaxies, can have modest densities. For instance, Sagittarius A*, the black hole at the center of our Milky Way galaxy, is 4.3 million M☉. Fuzzball theory predicts that a non-spinning supermassive black hole with the same mass as Sagittarius A* has a mean density "only" 51 times that of gold. Moreover, at 3.9 billion M☉ (a rather large super-massive black hole), a non-spinning fuzzball would have a radius of 77 astronomical units—about the same size as the termination shock of the Solar System's heliosphere—and a mean density equal to that of the Earth's atmosphere at sea level (1.2 kg/m3).[9]
Neutron star collapse
Black holes (or fuzzballs) are produced in various ways, most of which are exceedingly violent mass-shedding events like supernovas, kilonovas, and hypernovas. However, an accreting neutron star (one slowly siphoning off mass from a companion star) that exceeds a critical mass limit, Mmax, will suddenly and nonviolently (relatively speaking) collapse into a black hole or fuzzball. Such a collapse can serve as a helpful case study when examining the differences between the physical properties of neutron stars and fuzzballs.
Neutron stars have a maximum possible mass, known as the Tolman–Oppenheimer–Volkoff limit; this limit is not precisely known, but it is believed to lie between 2.2 M☉ and 2.9 M☉. If a neutron star exceeds this mass, neutron degeneracy pressure can no longer resist the force of gravity and it will rapidly collapse until some new physical process takes over. In classical general relativity, the collapsing neutron star reaches a critical density and forms an event horizon; to the outside universe it becomes a black hole, and the collapse proceeds towards a gravitational singularity. In the fuzzball model, the hadrons in its core (neutrons and perhaps a smattering of protons and mesons) decompose into what could be regarded as the final stage of degenerate matter: a ball of strings, which fuzzball theory predicts is the true quantum description of not only black holes but theorized quark stars composed of quark matter.
Information paradox
Classical black holes create a problem for physics known as the black hole information paradox; there is no such paradox under fuzzball theory. The paradox was first raised in 1972 by Jacob Bekenstein and later popularized by Stephen Hawking. The information paradox is born of a requirement of quantum mechanics that quantum information must be conserved, which conflicts with general relativity's requirement that if black holes have singularities at their centers, quantum information must be extinguished from spacetime. This paradox can be viewed as a contradiction between two very different theories: general relativity, which describes the largest gravity-based phenomena in the Universe, and quantum mechanics, which describes the smallest phenomena. Fuzzball theory purports to resolve this tension because the Type IIB superstring theory it is based on is a quantum description of gravity called supergravity.
A black hole that fed primarily on the stellar atmosphere (protons, neutrons, and electrons) of a nearby companion star should, if it obeyed the known laws of quantum mechanics, grow to have a quantum composition different from another black hole that fed only on light (photons) from neighboring stars and the cosmic microwave background. This follows a core precept of both classical and quantum physics that, in principle, the state of a system at one point in time should determine its state at any other time.
Yet, general relativity's implications for classic black holes are inescapable: Other than the fact that the two black holes would become increasingly massive due to the infalling matter and light, no difference in their quantum compositions would exist because if singularities have zero volume, black holes have no quantum composition. Moreover, even if quantum information was not extinguished at singularities, it could not climb against infinite gravitational intensity and reach up to and beyond the event horizon where it could reveal itself in normal spacetime. This is called the no-hair theorem, which states that black holes can reveal nothing about themselves to outside observers except their mass, angular momentum, and electric charge, whereby the latter two could theoretically be revealed through a phenomenon known as superradiance.[10]
For classic black holes (those with singularities at their centers), Hawking radiation (radiation proposed by the theoretical physicist Stephen Hawking that comprises photons and possibly other quanta theorized to be emitted from the proximity of black holes) cannot circumvent the no-hair theorem as it can reveal only a black hole's mass. However, this is in a highly theoretical sense since Hawking radiation is, for all practical purposes, undetectable (see §Testability of the theory, below).
Hawking radiation is created whenever massless and truly neutral virtual particle pairs—virtual photons for modern expositions of this topic—form in proximity to, but outside of, an event horizon.[Note 2] One member of a virtual particle pair possesses negative mass-energy (in the absolute E = mc2 sense), the other has positive mass-energy, and the average pair's net energy is zero.[11]The virtual photon possessing negative energy is captured; it travels down through the event horizon via quantum tunneling, whereupon it becomes part of the black hole (robbing it of energy and an equivalent amount of mass). Meanwhile, the pair member with positive energy is ejected, carrying away its share of energy from the black hole; this is Hawking radiation, wherein the ejected photons are no longer virtual and are real.
Hawking showed that his now-eponymously named radiation takes the form of blackbody thermal emissions that make black holes appear to be blackbody radiators with effective temperatures that, despite being extraordinarily close to absolute zero, are inversely proportional to the mass of a black hole. If one could collect a sufficient number of Hawking radiation photons, their spectrum distribution would reveal the mass of the black hole that emitted them.
It is essential to bear in mind that the above description of the origin of Hawking radiation is highly simplified. Even though Hawking's scientific paper, "Particle Creation by Black Holes," was directed to theoretical physicists and delved into arcane phenomena like Killing vector fields, Hawking cautioned that his descriptions of the mechanism responsible for black hole thermal emission "are heuristic only and should not be taken too literally." Note that heuristic teaching means "a teaching method where students learn on their own through discovery and problem-solving in lieu of pure instruction," however, in theoretical physics, the verb heuristic can connote "treated in a simpler manner than it really is," whereas the compound noun heuristic approach tends to mean "a simpler or more intuitive way to examine or explain a phenomenon."[12] Nonetheless, Hawking's advisement to his peers to not take his explanations too literally bears witness to the complexities underlying Hawking radiation. His advisement also underscores his remarkable achievement of producing a mathematical formula relating photon emissions from black holes of any given mass to a blackbody temperature. Within that formula, Hawking linked thermodynamics to a variety of disparate disciplines in physics: quantum mechanics, relativity, Newtonian mechanics, and gravitation, as shown below.
The amount of Hawking radiation emitted by black holes, or their luminosity, is inversely proportional to the square of their mass. Such calculations assume that Hawking radiation comprises only photons; that assumption is used throughout this and related articles on Wikipedia. That equation is as follows: [9]
The term L (luminosity) represents power in watts (an exceedingly small portion of a watt for Hawking radiation), which can be converted to other measures such as mass loss rates. Details on the formula's other terms are beyond the scope of this article and are covered at Bekenstein–Hawking formula. The formula's name honors Jacob Bekenstein (1947–2015), who laid down essential foundations of black hole theory that predated Hawking's contributions by several years.
In a purely theoretical sense, the fuzzball theory advanced by Mathur and Lunin goes beyond Hawking's formula relating the blackbody temperature of Hawking radiation and the mass of the black hole emitting it. Fuzzball theory satisfies the requirement that quantum information be conserved because it holds, in part, that the quantum information of the strings that fall onto a fuzzball is preserved as those strings dissolve into and contribute to the fuzzball's quantum makeup. The theory further holds that a fuzzball's quantum information is not only expressed at its surface but tunnels up through the tunneling fuzziness of the event horizon where it can be imprinted on Hawking radiation, which very slowly carries that information into regular spacetime in the form of delicate correlations in the outgoing quanta.[1]
Fuzzball theory's proposed solution to the black hole information paradox resolves a significant incompatibility between quantum mechanics and general relativity. While Einstein made important contributions to quantum mechanics, he had objections to it. Throughout the remainder of his career, Einstein searched in vain for a unifying theory—a Theory of Everything, so to speak, that explained all aspects of the universe.[13][14] To this day, there is no widely accepted theory of quantum gravity—a quantum description of gravity—that is in harmony with general relativity. However, all five variations of superstring theory, including the Type IIB variant upon which fuzzball theory is based, have quantum gravity incorporated into them. Moreover, all five versions have been hypothesized as actually constituting five different limits, or subsets, that are unified under M-theory.[1][15]
Testability of the theory
As no direct experimental evidence supports either string theory or fuzzball theory, both are products purely of calculations and theoretical research.[4] However, theories must be experimentally testable if there is to be a possibility of ascertaining their validity.[16] To be in full accordance with the scientific method and one day be widely accepted as true—as are Einstein's theories of special and general relativity—theories regarding the natural world must make predictions that are consistently affirmed through observations of nature. Superstring theory predicts the existence of highly elusive particles that, while they are actively being searched for, have yet to be detected. Moreover, fuzzball theory cannot be substantiated by observing its predicted subtle effects on Hawking radiation because the radiation itself is for all practical purposes undetectable.[17] However, fuzzball theory may be testable through gravitational-wave astronomy.[5]
The first challenge insofar as the testability of fuzzball theory is it is rooted in unproven superstring theory, which is short for supersymmetric string theory (see Fig. 8 ). Supersymmetry predicts that for each known quanta (particle) in the Standard Model, a superpartner particle exists that differs by spin 1⁄2. This means that for every boson (massless particles in the Standard Model with integer spins like 0, 1, and 2), there is a supersymmetric-spin fermion-like particle known as a gaugino that has a half-odd-integer spin (e.g., 1⁄2 and 3⁄2) and possesses a rest mass. Examining this spin-1⁄2 supersymmetry in the opposite direction, superstring theory predicts that fermions from the Standard Model have boson-like superpartners known as sfermions, except that unlike actual gauge bosons from the Standard Model, sfermions don't strongly act as force carriers.[18] All bosons (e.g., photons) and the boson-like sfermions will readily overlap each other when crowded, whereas fermions and the fermion-like gauginos possessing mass (such as electrons, protons, and quarks) will not; this is one reason why superpartners—if they exist—have properties that are exceedingly different from their Standard Model counterparts. Take the example of the photon, which is a massless boson with an integer spin of 1 and is the carrier of electromagnetism in the Standard Model; it is predicted to have a superpartner called a photino, which is a mass-carrying fermion with a half-odd-integer spin of 1⁄2. Conversely, the electron (spin 1⁄2) is an example of a mass-carrying fermion where its superpartner is the spin-0 selectron, which is a massless boson but is not considered to be a primary force carrier.
The experimental detection of superpartners would not only bolster superstring theory but would also help fill gaps in current particle physics, such as the likely composition of dark matter and the muon's anomalous magnetic moment (it should be precisely equal to 2 and is instead about 2.00233184, suggesting hidden interactions); particle physicists have accordingly been searching for these superpartners.[19][20] Based on cosmological effects, there is strong evidence for the existence of dark matter of some sort (see Dark matter: Observational evidence), but if it is composed of subatomic particles, those particles have proven to be notoriously elusive despite the wide variety of detection techniques that have been employed since 1986.[21] This difficulty in detecting supersymmetric particles is not surprising to particle physicists since the lightest ones are believed to be stable, electrically neutral, and interact weakly with the particles of the Standard Model.[18] Though many searches using particle colliders have ruled out certain mass ranges for supersymmetric particles, the hunt continues.[22]
Fuzzball theory resolves a long-standing conflict between general relativity and quantum mechanics by holding that quantum information is preserved in fuzzballs and that Hawking radiation originating within the Planck-scale quantum foam just above a fuzzball's surface is subtly encoded with that information. As a practical matter, however, Hawking radiation is virtually impossible to detect because black holes emit it at astronomically low power levels and the individual photons constituting Hawking radiation have extraordinarily little energy.[17] This underlies why theoretically perfectly quiescent black holes (ones in a universe containing no matter or other types of electromagnetic radiation to absorb) evaporate so slowly as they lose energy (and equivalent amounts of mass) via Hawking radiation; even a modest 4.9 M☉ black hole would require 1059 times the current age of the Universe to vanish. Moreover, a top-of-the-list 106 billion M☉ supermassive black hole would require ten million-trillion-trillion times longer still to evaporate: 1090 times the age of the Universe.[9]
Hawking showed that the energy of photons released by Hawking radiation is inversely proportional to the mass of a black hole and, consequently, the smallest black holes emit the most energetic photons that are the least difficult to detect. However, the radiation emitted by even a minimum-size, 2.7 M☉ black hole (or fuzzball) comprises extremely low-energy photons that are equivalent to those emitted by a black body with a temperature of around 23 billionths of one kelvin above absolute zero. More challenging still, such a black hole has a radiated power—for the entire black hole—of 1.2×10−29 watt (12 billion-billion-billionths of one milliwatt).[9] Such an infinitesimal transmitted power is to one watt as 1⁄3000th of a drop of water (about one-quarter the volume of a typical grain of table salt) is to all the Earth's oceans.
Critically though, when signals are this weak, the challenge is no longer one of classic radio astronomy technological issues like gain and signal-to-noise ratio; Hawking radiation comprises individual photon quanta, so such a weak signal means a 2.7 M☉ black hole is emitting at most only ten photons per second.[Note 3] Even if such a black hole was only 100 lightyears away, the odds of just one of its Hawking radiation photons landing anywhere on Earth—let alone being captured by an antenna—while a human is watching are astronomically improbable.[Note 4] Importantly, the above values are for the smallest possible stellar-mass black holes; far more difficult yet to detect is the Hawking radiation emitted by supermassive black holes at the center of galaxies. For instance, M87* (Fig. 9 ), which is an unremarkable supermassive black hole, emits Hawking radiation at a near-nonexistent radiant power of at most 13 photons per century and does so with a wavelength so great that a receiving antenna possessing even a modest degree of absorption efficiency would be larger than the Solar System.[9]
However, fuzzball theory may be testable through gravitational-wave astronomy. Gravitational wave observatories like the Laser Interferometer Gravitational-Wave Observatory (LIGO) have proven to be a revolutionary advancement in astronomy and are enabling astronomers and theoretical physicists to develop ever-more detailed insights into compact objects such as neutron stars and black holes.[23] Ever since the first direct detection of gravity waves, a 2015 event known as GW150914, which was a merger between a binary pair of stellar-mass black holes, gravity-wave signals have so far matched the predictions of general relativity for classical black holes with singularities at their centers. However, an Italian team of scientists that ran computer simulations suggested in 2021 that existing gravity-wave observatories are capable of discerning fuzzball-theory-supporting evidence in the signals from merging binary black holes (and the resultant effects on ringdowns) by virtue of the nontrivial unique attributes of fuzzballs, which are extended objects with a physical structure. The team's simulations predicted slower-than-expected decay rates for certain vibration modes that would also be dominated by "echoes" from earlier ring oscillations.[5] Moreover, a separate Italian team a year earlier posited that future gravity-wave detectors, such as the proposed Laser Interferometer Space Antenna (LISA), which is intended to have the ability to observe high-mass binary mergers at frequencies far below the limits of current observatories, would improve the ability to confirm aspects of fuzzball theory by orders of magnitude.[24]
See also
- Black hole information paradox
- Black hole thermodynamics
- Cosmic censorship hypothesis
- Degenerate matter
- Ergosphere
- Event horizon
- General relativity
- Gravitational singularity
- Hawking radiation
- Horizon (general relativity) (a list of types)
- M-theory
- Minkowski space
- Neutron star
- Planck star
- Rotating black hole
- Quantum foam
- Quantum gravity
- Spacetime
- Spacetime diagram
- Spaghettification
- Special relativity
- String (physics)
- String duality
- String theory
- Supermassive black hole
- Superstring theory
- Timeline of black hole physics
- Type II string theory
- Virtual particle
Notes
- ^ Smaller fuzzballs would be denser yet. A small, 2.7 M☉ would have a mean density of 2.53×1018 kg/m3. A bit of such a fuzzball the size of a drop of water would have a mass of 126 million metric tons, which is the mass of a granite ball 449 meters in diameter.
The smallest fuzzballs are denser than neutron stars; a 2.48 M☉ fuzzball (possibly as small as black holes or fuzzballs can be) would be 5 to 7½ times denser than a neutron star. On a "teaspoon" (5 mL) basis, which is a common measure for conveying density in the popular press for articles directed to a general-interest readership, some notable comparative mean densities are as follows:
- 2.48 M☉ fuzzball (perhaps the smallest possible): 15.0 billion metric tons per teaspoon
- 2.70 M☉ fuzzball (a very small stellar-mass one): 12.6 billion metric tons per teaspoon
- 6.79 M☉ fuzzball (a common stellar-mass one): 2.00 billion metric tons per teaspoon
- 9.60 M☉ fuzzball: (a not-uncommon stellar-mass one) 1.00 billion metric tons per teaspoon
- Neutron star: 2–3 billion metric tons per teaspoon.
- ^ In his 1975 paper, Hawking wrote that the radiation emitted by black holes, now called "Hawking radiation," would consist only of massless virtual particles. He specified the composition as photons, gravitons, neutrinos, and other "massless fermions." His paper was before the discovery that neutrinos have mass.
- ^ A 2.7 M☉ black hole (or fuzzball) emits peak-emission photons that have been very gravitationally redshifted due to having climbed out of an extreme gravity well and possess an energy of only 7.719×10−12 electron-volt, which is 1.234×10−30 joule per photon. With such a black hole radiating at a power of 1.235×10−29 watt, it would be emitting ten quanta packets (photons) per second. This rate assumes, though, that the radiated energy consists solely of photons. Hawking predicted (a PDF of his paper is here) that black holes would emit not only photons, but gravitons, neutrinos, and other "massless fermions" as well. However, Hawking submitted his paper in 1975, long before the 2001 discovery that neutrinos changed "flavor," so he incorrectly believed neutrinos (a fermion) to be massless. Consequently, gravitons are undetectable hypothetical entities, neutrinos possess a small but as-yet indeterminant mass and are very nearly undetectable, and the only other known massless fermion is the Weyl fermion, which is an emergent quasiparticle first detected inside synthetic crystals in 2015. Accordingly, ten photons per second is the upper bound for the emission rate and is the only quanta of radiated energy that can be readily detected.
- ^ For a 2.7 M☉ black hole (or fuzzball) that is emitting ten photons per second and is 100 lightyears away (closer than the nearest known black hole), by the time the photons traveled those 100 lightyears, they will have disbursed over an imaginary sphere with an area of 1.125×1037 square meters, or 8.82×1022 Earth-silhouettes. Even if people continually watched for 279,000 years (roughly as long as Homo sapiens have existed), the odds of just one of those photons impacting somewhere on Earth are one in a billion.
References
- ^ a b c d "The Fuzzball Fix for a Black Hole Paradox", Jennifer Ouellette, Quanta Magazine, (June 23, 2015)
- ^ Nadis, Steve (2 December 2019). "Black Hole Singularities Are as Inescapable as Expected". quantamagazine.org. Quanta Magazine. Archived from the original on 14 April 2020. Retrieved 22 April 2020.
- ^ "The fuzzball paradigm for black holes: FAQ", Samir D. Mathur, (January 22, 2009) (395 KB)
- ^ a b "Why String Theory?", Joseph Conlon, CRC Press, (2016) ISBN 978-1482242478
- ^ a b c "A Way to Experimentally Test String Theory's 'Fuzzball' Prediction", APS Journals, (September 16, 2021)
- ^ The primary paper was a 2002 publication (#3, below) titled "A proposal to resolve the black hole information paradox". The list:
1) "AdS/CFT duality and the black hole information paradox", Oleg Lunin and Samir D. Mathur, arXiv:hep-th/0109154, (September 20, 2001). This is a paper about the AdS/CFT correspondence, which examines the relationships between two different theories: Anti-de Sitter space (AdS), and Conformal field theory (CFT), wherein the former deals with quantum gravity and the latter deals with quantum field theory. The AdS/CFT correspondence is central to resolving the black hole information paradox.
2) "Statistical interpretation of Bekenstein entropy for systems with a stretched horizon", Oleg Lunin and Samir D. Mathur, ArXiv:hep-th/0202072, (February 12, 2002)
3) "A proposal to resolve the black hole information paradox", Samir D. Mathur, ArXiv:hep-th/0205192, (May 19, 2002)
4) "The fuzzball proposal for black holes: an elementary review", Samir D. Mathur, ArXiv:hep-th/0502050, (February 3, 2005)
5) "What Exactly is the Information Paradox?", Samir D. Mathur, ArXiv:0803.2030, (March 13, 2008)
6) "Fuzzballs and the information paradox: a summary and conjectures", Samir D. Mathur, ArXiv:0909.1038, (October 24, 2008)
7) "The information paradox: A pedagogical introduction", Samir D. Mathur, ArXiv:0909.1038, (January 25, 2011)
8) "Black Holes and Beyond", Samir D. Mathur, ArXiv:1205.0776, (May 14, 2012) - ^ "A proposal to resolve the black hole information paradox", Samir D. Mathur, ArXiv:hep-th/0205192, (May 19, 2002)
- ^ "Information Paradox Solved? If So, Black Holes Are "Fuzzballs"", The Ohio State University, (February 29, 2004)
- ^ a b c d e Vttoth.com: Hawking radiation calculator
- ^ In his paper, "Particle Creation by Black Holes" (PDF), Hawking wrote, in §2 on page 204, as follows:
However there is a classical phenomenon called superradiance [14-17] in which waves incident in certain modes on a rotating or charged black hole are scattered with increased amplitude [see Section (3)].
In §3, 'Angular Momentum and Charge,' which is 2½ pages starting on page 213, Hawking began the formula-rich section with the following:
If the collapsing body was rotating or electrically charged, the resulting black hole would settle down to a stationary state which was described, not by the Schwarzchild solution, but by a charged Kerr solution characterised by the mass M, the angular momentum J, and the charge Q.Superradiance was proposed theoretically by Robert H. Dicke in 1954, and in 1973 was experimentally observed in hydrogen fluoride atoms by N. Skribanowitz et al. However, superradiance is yet to be detected at black holes, per "Black hole 'superradiance' phenomenon may aid quest for dark matter", Paul Sutter, Space.com, (August 16, 2022).
- ^ Peskin, Michael E. (2018-05-04). An Introduction To Quantum Field Theory. doi:10.1201/9780429503559. ISBN 978-0-429-97210-2.
- ^ Examples: "An Introduction to QED & QCD", (PDF) F. Hautmann, Dept. of Theoretical Physics, University of Oxford (September 2010); "Quantum Electro and Chromodynamics treated by Thompson’s heuristic approach", (PDF) Cláudio Nassif, The Brazilian Center for Research in Physics (October 24, 2018)
- ^ Abraham Pais (September 23, 1982). Subtle is the Lord : The Science and the Life of Albert Einstein: The Science and the Life of Albert Einstein. Oxford University Press. ISBN 978-0-19-152402-8.
- ^ Steven Weinberg (April 20, 2011). Dreams of a Final Theory: The Scientist's Search for the Ultimate Laws of Nature. Knopf Doubleday Publishing Group. ISBN 978-0-307-78786-6.
- ^ Overbye, Dennis (January 24, 2023). "Where is Physics Headed (and How Soon Do We Get There)? - Two leading scientists discuss the future of their field - Comment". The New York Times. Archived from the original on January 25, 2023. Retrieved January 28, 2023.
- ^ "Philosophy of science for scientists", Lars-Göran Johansson, Springer–Cham, (2016), doi: 10.1007/978-3-319-26551-3
- ^ a b "What is Hawking radiation?", Dr. Alastair Gunn, BBC Science Focus, (April 16, 2022)
- ^ a b "Supersymmetry", CERN/Science/Physics
- ^ "In search of supersymmetric dark matter", CERN/News/News/Physics, (October 9, 2023)
- ^ "Muon g-2 doubles down with latest measurement, explores uncharted territory in search of new physics", Fermi National Accelerator Laboratory, (August 10, 2023)
- ^ "The Hunt for Dark Matter Particles", Caltech.edu
- ^ "ATLAS releases comprehensive review of supersymmetric dark matter", CERN/Updates/Physics-Briefing, (August 22, 2023)
- ^ "The Gravitational-Wave ‘Revolution’ Is Underway", Jonathan O'Callaghan, Scientific American, (September 12, 2019)
- ^ "Phenomenological Imprints of the String-Theory 'Fuzzball' Scenario", University of Rome–La Sapienza, (November 24, 2020)
External links
- Are Black Holes Fuzzballs? — Space Today Online
- The Fuzzball Fix for a Black Hole Paradox, June 23, 2015 — Quanta Magazine
- Information paradox solved? If so, Black Holes are "Fuzzballs" — The Ohio State University
- ArXiv.org link: Unwinding of strings thrown into a fuzzball — Stefano Giusto and Samir D. Mathur
- Astronomers take virtual plunge into black hole (84 MB) (10 MB version), a 40-second animation produced by JILA — a joint venture of the University of Colorado at Boulder and the NIST
- Video lecture series at CERN (four parts approximately an hour each): "The black hole information problem and the fuzzball proposal", Part 1, Part 2, Part 3, Part 4