The surface gravity, g, of an astronomical object is the gravitational acceleration experienced at its surface at the equator, including the effects of rotation. The surface gravity may be thought of as the acceleration due to gravity experienced by a hypothetical test particle which is very close to the object's surface and which, in order not to disturb the system, has negligible mass. For objects where the surface is deep in the atmosphere and the radius not known, the surface gravity is given at the 1 bar pressure level in the atmosphere.
In astrophysics, the surface gravity may be expressed as log g, which is obtained by first expressing the gravity in cgs units, where the unit of acceleration and surface gravity is centimeters per second squared (cm/s2), and then taking the base-10 logarithm of the cgs value of the surface gravity.[2] Therefore, the surface gravity of Earth could be expressed in cgs units as 980.665 cm/s2, and then taking the base-10 logarithm ("log g") of 980.665, giving 2.992 as "log g".
The surface gravity of a white dwarf is very high, and of a neutron star even higher. A white dwarf's surface gravity is around 100,000 g (106 m/s2) whilst the neutron star's compactness gives it a surface gravity of up to 7×1012 m/s2 with typical values of order 1012 m/s2 (that is more than 1011 times that of Earth). One measure of such immense gravity is that neutron stars have an escape velocity of around 100,000 km/s, about a third of the speed of light. For black holes, the surface gravity must be calculated relativistically.
Relationship of surface gravity to mass and radius
In the Newtonian theory of gravity, the gravitational force exerted by an object is proportional to its mass: an object with twice the mass-produces twice as much force. Newtonian gravity also follows an inverse square law, so that moving an object twice as far away divides its gravitational force by four, and moving it ten times as far away divides it by 100. This is similar to the intensity of light, which also follows an inverse square law: with relation to distance, light becomes less visible. Generally speaking, this can be understood as geometric dilution corresponding to point-source radiation into three-dimensional space.
A large object, such as a planet or star, will usually be approximately round, approaching hydrostatic equilibrium (where all points on the surface have the same amount of gravitational potential energy). On a small scale, higher parts of the terrain are eroded, with eroded material deposited in lower parts of the terrain. On a large scale, the planet or star itself deforms until equilibrium is reached.[4] For most celestial objects, the result is that the planet or star in question can be treated as a near-perfect sphere when the rotation rate is low. However, for young, massive stars, the equatorial azimuthal velocity can be quite high—up to 200 km/s or more—causing a significant amount of equatorial bulge. Examples of such rapidly rotating stars include Achernar, Altair, Regulus A and Vega.
The fact that many large celestial objects are approximately spheres makes it easier to calculate their surface gravity. According to the shell theorem, the gravitational force outside a spherically symmetric body is the same as if its entire mass were concentrated in the center, as was established by Sir Isaac Newton.[5] Therefore, the surface gravity of a planet or star with a given mass will be approximately inversely proportional to the square of its radius, and the surface gravity of a planet or star with a given average density will be approximately proportional to its radius. For example, the recently discovered planet, Gliese 581 c, has at least 5 times the mass of Earth, but is unlikely to have 5 times its surface gravity. If its mass is no more than 5 times that of the Earth, as is expected,[6] and if it is a rocky planet with a large iron core, it should have a radius approximately 50% larger than that of Earth.[7][8] Gravity on such a planet's surface would be approximately 2.2 times as strong as on Earth. If it is an icy or watery planet, its radius might be as large as twice the Earth's, in which case its surface gravity might be no more than 1.25 times as strong as the Earth's.[8]
These proportionalities may be expressed by the formula:
where g is the surface gravity of an object, expressed as a multiple of the Earth's, m is its mass, expressed as a multiple of the Earth's mass (5.976×1024 kg) and r its radius, expressed as a multiple of the Earth's (mean) radius (6,371 km).[9] For instance, Mars has a mass of 6.4185×1023 kg = 0.107 Earth masses and a mean radius of 3,390 km = 0.532 Earth radii.[10] The surface gravity of Mars is therefore approximately
times that of Earth. Without using the Earth as a reference body, the surface gravity may also be calculated directly from Newton's law of universal gravitation, which gives the formula
where M is the mass of the object, r is its radius, and G is the gravitational constant. If ρ = M/V denote the mean density of the object, this can also be written as
so that, for fixed mean density, the surface gravity g is proportional to the radius r. Solving for mass, this equation can be written as
But density is not constant, but increases as the planet grows in size, as they are not incompressible bodies. That is why the experimental relationship between surface gravity and mass does not grow as 1/3 but as 1/2:[11]
here with g in times Earth's surface gravity and M in times Earth's mass. In fact, the exoplanets found fulfilling the former relationship have been found to be rocky planets.[11] Thus, for rocky planets, density grows with mass as
.
Gas giants
For gas giant planets such as Jupiter, Saturn, Uranus, and Neptune, the surface gravity is given at the 1 bar pressure level in the atmosphere.[12] It has been found that for giant planets with masses in the range up to 100 times Earth's mass, their gravity surface is nevertheless very similar and close to 1g, a region named the gravity plateau.[11]
Non-spherically symmetric objects
Most real astronomical objects are not perfectly spherically symmetric. One reason for this is that they are often rotating, which means that they are affected by the combined effects of gravitational force and centrifugal force. This causes stars and planets to be oblate, which means that their surface gravity is smaller at the equator than at the poles. This effect was exploited by Hal Clement in his SF novel Mission of Gravity, dealing with a massive, fast-spinning planet where gravity was much higher at the poles than at the equator.
To the extent that an object's internal distribution of mass differs from a symmetric model, the measured surface gravity may be used to deduce things about the object's internal structure. This fact has been put to practical use since 1915–1916, when Roland Eötvös's torsion balance was used to prospect for oil near the city of Egbell (now Gbely, Slovakia.)[13]: 1663 [14]: 223 In 1924, the torsion balance was used to locate the Nash Dome oil fields in Texas.[14]: 223
It is sometimes useful to calculate the surface gravity of simple hypothetical objects which are not found in nature. The surface gravity of infinite planes, tubes, lines, hollow shells, cones, and even more unrealistic structures may be used to provide insights into the behavior of real structures.
Black holes
In relativity, the Newtonian concept of acceleration turns out not to be clear cut. For a black hole, which must be treated relativistically, one cannot define a surface gravity as the acceleration experienced by a test body at the object's surface because there is no surface, although the event horizon is a natural alternative candidate, but this still presents a problem because the acceleration of a test body at the event horizon of a black hole turns out to be infinite in relativity. Because of this, a renormalized value is used that corresponds to the Newtonian value in the non-relativistic limit. The value used is generally the local proper acceleration (which diverges at the event horizon) multiplied by the gravitational time dilation factor (which goes to zero at the event horizon). For the Schwarzschild case, this value is mathematically well behaved for all non-zero values of r and M.
When one talks about the surface gravity of a black hole, one is defining a notion that behaves analogously to the Newtonian surface gravity, but is not the same thing. In fact, the surface gravity of a general black hole is not well defined. However, one can define the surface gravity for a black hole whose event horizon is a Killing horizon.
The surface gravity of a static Killing horizon is the acceleration, as exerted at infinity, needed to keep an object at the horizon. Mathematically, if is a suitably normalized Killing vector, then the surface gravity is defined by
where the equation is evaluated at the horizon. For a static and asymptotically flat spacetime, the normalization should be chosen so that as , and so that . For the Schwarzschild solution, take to be the time translationKilling vector, and more generally for the Kerr–Newman solution take , the linear combination of the time translation and axisymmetry Killing vectors which is null at the horizon, where is the angular velocity.
Schwarzschild solution
Since is a Killing vector implies . In coordinates . Performing a coordinate change to the advanced Eddington–Finklestein coordinates causes the metric to take the form
Under a general change of coordinates the Killing vector transforms as giving the vectors and
Considering the b = entry for gives the differential equation
The surface gravity for the uncharged, rotating black hole is, simply
where is the Schwarzschild surface gravity, and is the spring constant of the rotating black hole. is the angular velocity at the event horizon. This expression gives a simple Hawking temperature of .[16]
Kerr–Newman solution
The surface gravity for the Kerr–Newman solution is
where is the electric charge, is the angular momentum, define to be the locations of the two horizons and .
Dynamical black holes
Surface gravity for stationary black holes is well defined. This is because all stationary black holes have a horizon that is Killing.[17] Recently there has been a shift towards defining the surface gravity of dynamical black holes whose spacetime does not admit a timelike Killing vector (field).[18] Several definitions have been proposed over the years by various authors, such as peeling surface gravity and Kodama surface gravity.[19] As of current, there is no consensus or agreement on which definition, if any, is correct.[20]Semiclassical results indicate that the peeling surface gravity is ill-defined for transient objects formed in finite time of a distant observer.[21]
References
^Taylor, Barry N., ed. (2001). The International System of Units (SI)(PDF). United States Department of Commerce: National Institute of Standards and Technology. p. 29. Retrieved 2012-03-08. {{cite book}}: |work= ignored (help)
^"Why is the Earth round?". Ask A Scientist. Argonne National Laboratory, Division of Educational Programs. Archived from the original on 21 September 2008.
^Book I, §XII, pp. 218–226, Newton's Principia: The Mathematical Principles of Natural Philosophy, Sir Isaac Newton, tr. Andrew Motte, ed. N. W. Chittenden. New York: Daniel Adee, 1848. First American edition.
^H. Kodama (1980). "Conserved Energy Flux for the Spherically Symmetric System and the Backreaction Problem in the Black Hole Evaporation". Progress of Theoretical Physics. 63 (4): 1217. Bibcode:1980PThPh..63.1217K. doi:10.1143/PTP.63.1217. S2CID122827579.
В Википедии есть статьи о других людях с фамилией Бэкон. Эта статья — об английском философе. Об английском художнике XX века см. Бэкон, Фрэнсис (художник). Фрэнсис Бэконангл. Francis Bacon Бэкон на портрете кисти Д. Вандербанка Лорд-канцлер Англии 1618 — 1621 Монарх Я...
Marian shrine in Ireland Church in County Mayo, IrelandBasilica Shrine of Our Lady of Knock, Queen of IrelandCnoc MhuireSanctuary of Our Lady of KnockBasilica Shrine of Our Lady of Knock, Queen of Ireland53°47′32″N 8°55′04″W / 53.792099°N 8.917659°W / 53.792099; -8.917659LocationKnock, County MayoCountryIrelandLanguage(s)English, IrishDenominationCatholicTraditionRoman RiteWebsiteknockshrine.ieHistoryDedicationOur Lady of KnockArchitectureArchitectural type...
Japanese National University in Sapporo, Hokkaido, Japan Hokkaido University北海道大学Motto少年よ、大志を抱けMotto in EnglishBoys, Be AmbitiousTypePublic (National)EstablishedFounded September 1876 (as Sapporo Agricultural College),Chartered April 1, 1918PresidentKiyohiro HoukinAdministrative staff6,250Undergraduates11,935 (2017)[1]Postgraduates6,336 (2017)[1]Other students89 research students (2017)[1]LocationSapporo, Hokkaido, Japan43°04′29″N ...
RAF Elsham Wolds Elsham, Lincolnshire in EnglandMemorial dedicated to those lost on operationsRAF Elsham WoldsShown within LincolnshireShow map of LincolnshireRAF Elsham WoldsRAF Elsham Wolds (the United Kingdom)Show map of the United KingdomCoordinates53°36′23″N 000°25′19″W / 53.60639°N 0.42194°W / 53.60639; -0.42194TypeParent station 1941-4313 Base 1943-47CodeESSite informationOwnerAir MinistryOperatorRoyal Air ForceControlled byRAF Bomber Comm...
Questa voce o sezione sugli argomenti aziende alimentari e aziende britanniche non cita le fonti necessarie o quelle presenti sono insufficienti. Puoi migliorare questa voce aggiungendo citazioni da fonti attendibili secondo le linee guida sull'uso delle fonti. SchweppesLogo Stato Svizzera Fondazione1783 a Ginevra Fondata daJohann Jacob Schweppe Sede principaleGinevra SettoreAlimentare Sito webwww.schweppes.com Modifica dati su Wikidata · Manuale Schweppes è un marchio d...
Disambiguazione – Fermi rimanda qui. Se stai cercando altri significati, vedi Fermi (disambigua). Disambiguazione – Se stai cercando la nave militare, vedi Enrico Fermi (nave). «La professione del ricercatore deve tornare alla sua tradizione di ricerca per l'amore di scoprire nuove verità, dato che in tutte le direzioni siamo circondati dall'ignoto e la vocazione dell'uomo di scienza è di spostare in avanti le frontiere della nostra conoscenza in tutte le direzioni, non solo i...
Voce principale: OLED. Schema di un display AMOLED Il diodo a emissione di luce, organico a matrice attiva (in sigla AM-OLED, active matrix organic light emitting diode) è un tipo di diodi luminosi organici (OLED) sviluppato da Samsung per migliorare la qualità del display e abbattere i consumi date le dimensioni dei dispositivi mobili. Permette naturalmente, come gli altri OLED, anche di rendere leggermente curvi alcuni schermi a cristalli liquidi retroilluminati. Costituisce una declinaz...
1999 Japanese-French film After the RainJapanese film posterDirected byTakashi KoizumiScreenplay byAkira Kurosawa[1]Story byShugoro YamamotoProduced byMasato Hara[1]Starring Akira Terao Yoshiko Miyazaki Shiro Mifune Mieko Harada Tatsuya Nakadai CinematographyShoji Ueda[1][Link is incorrect, goes to photographer with same name. Use <https://letterboxd.com/cinematography/shoji-ueda/> for cinematographer~a Kurosawa stalwart.Edited byHideto Aga[1]Music byMasa...
الإصلاح الإنجليزي هو مصطلح يعبر عن سلسلة من الأحداث التي مرت بها إنجلترا في القرن السادس عشر، والتي أدت لانفصال كنيسة إنجلترا عن سلطة البابا والكنيسة الكاثوليكية. ارتبطت هذه الأحداث بعملية أوروبية أوسع وهي عملية الإصلاح البروتستانتي، وهي حركة دينية وسياسية أثرت على ممار...
English, Scottish, Irish and Great Britain legislationActs of parliaments of states preceding the United Kingdom Of the Kingdom of EnglandRoyal statutes, etc. issued beforethe development of Parliament 1225–1267 1275–1307 1308–1325 Temp. incert. 1327–1376 1377–1397 1399–1411 1413–1421 1422–1460 1461 1463 1464 1467 1468 1472 1474 1477 1482 1483 1485–1503 1509–1535 1536 1539–1540 1541 1542 1543 1545 1546 1547 1548 1549 1551 ...
South Korean financial holding company An editor has performed a search and found that sufficient sources exist to establish the subject's notability. Please help improve this article by adding citations to reliable sources. Unsourced material may be challenged and removed.Find sources: BNK Financial Group – news · newspapers · books · scholar · JSTOR (April 2023) (Learn how and when to remove this message) The topic of this article may not meet Wikipe...
English actress Beverley CallardCallard at Manchester Pride in 2010BornBeverley Jane Moxon (1957-03-28) 28 March 1957 (age 67)Morley, West Riding of Yorkshire, EnglandOccupationActressYears active1982–presentTelevision Emmerdale Farm Coronation Street The Peter Principle Two Pints of Lager and a Packet of Crisps I'm a Celebrity...Get Me Out of Here! Spouses Paul Atkinson (m. 1974; div. 1978) David Sowden (m...
Not to be confused with Chevrolet Bolt, also known as the Chevrolet Bolt EV. Motor vehicle Chevrolet Bolt EUVOverviewManufacturerGeneral MotorsProductionMay 2021[1] – November 2023Model years2022–20232026[2]Assembly Final assembly: GM Orion Assembly, Lake Orion, Michigan Battery/drivetrain, HVAC and instrument/infotainment systems: LG, Holland, Michigan & Hazel Park, Michigan Body and chassisClassSubcompact crossover SUVBody style5-door SUVLayoutFront-motor, ...
American sports car manufacturer For the race car manufacturer, see Élan Motorsport Technologies. This article has multiple issues. Please help improve it or discuss these issues on the talk page. (Learn how and when to remove these template messages) This article relies largely or entirely on a single source. Relevant discussion may be found on the talk page. Please help improve this article by introducing citations to additional sources.Find sources: Panoz – news · n...
Lineage and heraldry society National Society Colonial Dames XVII CenturyColonial Dames 17th CenturyThe Brigadier General George P. Scriven House, the organization's headquarters in Washington, D.C.FoundedJuly 15, 1915FounderMary Florence TaneyTypeNon-profit, lineage society, heraldry societyFocusHistoric preservation, education, patriotismHeadquartersBrigadier General George P. Scriven House 1300 New Hampshire Avenue, Washington, D.C., U.S.Membership 11,000[1]President GeneralYvonne ...
Radio station in Danville, KentuckyWHIRDanville, KentuckyFrequency1230 kHzBrandingNewstalk Sports 1230ProgrammingFormatNews Talk InformationAffiliationsNBC News RadioSportsMapUSA Radio NetworkPremiere NetworksKentucky Sports RadioDanville High School[1]Motor Racing Network[2]Performance Racing Network[3]OwnershipOwnerHometown Broadcasting of Danville IncSister stationsWHBN, WRNZHistoryFirst air dateOctober 27, 1947; 76 years ago (1947-10-27) [4 ...
River in Germany EineThe Eine in WelbslebenThe catchment of the Wipper with the Eine, its most important tributary, in the northwestLocationLocationSaxony-AnhaltPhysical characteristicsSource • locationsoutheast of Harzgerode • coordinates51°37′17.83″N 11°09′34.34″E / 51.6216194°N 11.1595389°E / 51.6216194; 11.1595389 • elevation420 m above sea level (NN) Mouth • ...
Wilhelm von Dönniges Grab auf dem Nichtkatholischen (Protestantischen) Friedhof Rom Franz Alexander Friedrich Wilhelm (von) Dönniges (* 13. Januar 1814 in Kolbatz, Kreis Greifenhagen, Pommern; † 4. Januar 1872 in Rom) war ein deutscher Historiker und Diplomat in Diensten des Königreichs Bayern. Bekannt wurde er durch das Duell um seine Tochter Helene von Dönniges. Inhaltsverzeichnis 1 Leben 2 Duell Lassalle versus Racowitza 3 Familie 4 Werke 5 Literatur 6 Einzelnachweise Leben Seine Elt...