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(Redirected from Humphreys–Davidson limit) Maximum luminosity of a body in hydrostatic equilibrium

The Eddington luminosity, also referred to as the Eddington limit, is the maximum luminosity a body (such as a star) can achieve when there is balance between the force of radiation acting outward and the gravitational force acting inward. The state of balance is called hydrostatic equilibrium. When a star exceeds the Eddington luminosity, it will initiate a very intense radiation-driven stellar wind from its outer layers. Since most massive stars have luminosities far below the Eddington luminosity, their winds are driven mostly by the less intense line absorption. The Eddington limit is invoked to explain the observed luminosities of accreting black holes such as quasars.

Originally, Sir Arthur Eddington took only the electron scattering into account when calculating this limit, something that now is called the classical Eddington limit. Nowadays, the modified Eddington limit also takes into account other radiation processes such as bound–free and free–free radiation interaction.

Derivation

The Eddington limit is obtained by setting the outward radiation pressure equal to the inward gravitational force. Both forces decrease by inverse-square laws, so once equality is reached, the hydrodynamic flow is the same throughout the star.

From Euler's equation in hydrostatic equilibrium, the mean acceleration is zero,

d u d t = p ρ Φ = 0 {\displaystyle {\frac {du}{dt}}=-{\frac {\nabla p}{\rho }}-\nabla \Phi =0}

where u {\displaystyle u} is the velocity, p {\displaystyle p} is the pressure, ρ {\displaystyle \rho } is the density, and Φ {\displaystyle \Phi } is the gravitational potential. If the pressure is dominated by radiation pressure associated with an irradiance F r a d {\displaystyle F_{\rm {rad}}} ,

p ρ = κ c F r a d . {\displaystyle -{\frac {\nabla p}{\rho }}={\frac {\kappa }{c}}F_{\rm {rad}}\,.}

Here κ {\displaystyle \kappa } is the opacity of the stellar material, defined as the fraction of radiation energy flux absorbed by the medium per unit density and unit length. For ionized hydrogen, κ = σ T / m p {\displaystyle \kappa =\sigma _{\rm {T}}/m_{\rm {p}}} , where σ T {\displaystyle \sigma _{\rm {T}}} is the Thomson scattering cross-section for the electron and m p {\displaystyle m_{\rm {p}}} is the mass of a proton. Note that F r a d = d 2 E / d A d t {\displaystyle F_{\rm {rad}}=d^{2}E/dAdt} is defined as the energy flux over a surface, which can be expressed with the momentum flux using E = p c {\displaystyle E=pc} for radiation. Therefore, the rate of momentum transfer from the radiation to the gaseous medium per unit density is κ F r a d / c {\displaystyle \kappa F_{\rm {rad}}/c} , which explains the right-hand side of the above equation.

The luminosity of a source bounded by a surface S {\displaystyle S} may be expressed with these relations as

L = S F r a d d S = S c κ Φ d S . {\displaystyle L=\int _{S}F_{\rm {rad}}\cdot dS=\int _{S}{\frac {c}{\kappa }}\nabla \Phi \cdot dS\,.}

Now assuming that the opacity is a constant, it can be brought outside the integral. Using Gauss's theorem and Poisson's equation gives

L = c κ S Φ d S = c κ V 2 Φ d V = 4 π G c κ V ρ d V = 4 π G M c κ {\displaystyle L={\frac {c}{\kappa }}\int _{S}\nabla \Phi \cdot dS={\frac {c}{\kappa }}\int _{V}\nabla ^{2}\Phi \,dV={\frac {4\pi Gc}{\kappa }}\int _{V}\rho \,dV={\frac {4\pi GMc}{\kappa }}}

where M {\displaystyle M} is the mass of the central object. This result is called the Eddington luminosity. For pure ionized hydrogen,

L E d d = 4 π G M m p c σ T 1.26 × 10 31 ( M M ) W = 1.26 × 10 38 ( M M ) e r g / s = 3.2 × 10 4 ( M M ) L {\displaystyle {\begin{aligned}L_{\rm {Edd}}&={\frac {4\pi GMm_{\rm {p}}c}{\sigma _{\rm {T}}}}\\&\cong 1.26\times 10^{31}\left({\frac {M}{M_{\bigodot }}}\right){\rm {W}}=1.26\times 10^{38}\left({\frac {M}{M_{\bigodot }}}\right){\rm {erg/s}}=3.2\times 10^{4}\left({\frac {M}{M_{\bigodot }}}\right)L_{\bigodot }\end{aligned}}}

where M {\displaystyle M_{\bigodot }} is the mass of the Sun and L {\displaystyle L_{\bigodot }} is the luminosity of the Sun.

The maximum possible luminosity of a source in hydrostatic equilibrium is the Eddington luminosity. If the luminosity exceeds the Eddington limit, then the radiation pressure drives an outflow.

The mass of the proton appears because, in the typical environment for the outer layers of a star, the radiation pressure acts on electrons, which are driven away from the center. Because protons are negligibly pressured by the analog of Thomson scattering, due to their larger mass, the result is to create a slight charge separation and therefore a radially directed electric field, acting to lift the positive charges, which, under the conditions in stellar atmospheres, typically are free protons. When the outward electric field is sufficient to levitate the protons against gravity, both electrons and protons are expelled together.

Different limits for different materials

The derivation above for the outward light pressure assumes a hydrogen plasma. In other circumstances the pressure balance can be different from what it is for hydrogen.

In an evolved star with a pure helium atmosphere, the electric field would have to lift a helium nucleus (an alpha particle), with nearly 4 times the mass of a proton, while the radiation pressure would act on 2 free electrons. Thus twice the usual Eddington luminosity would be needed to drive off an atmosphere of pure helium.

At very high temperatures, as in the environment of a black hole or neutron star, high-energy photons can interact with nuclei, or even with other photons, to create an electron–positron plasma. In that situation the combined mass of the positive–negative charge carrier pair is approximately 918 times smaller (half of the proton-to-electron mass ratio), while the radiation pressure on the positrons doubles the effective upward force per unit mass, so the limiting luminosity needed is reduced by a factor of ≈ 918×2.

The exact value of the Eddington luminosity depends on the chemical composition of the gas layer and the spectral energy distribution of the emission. A gas with cosmological abundances of hydrogen and helium is much more transparent than gas with solar abundance ratios. Atomic line transitions can greatly increase the effects of radiation pressure, and line-driven winds exist in some bright stars (e.g., Wolf–Rayet and O-type stars).

Super-Eddington luminosities

The role of the Eddington limit in today's research lies in explaining the very high mass loss rates seen in, for example, the series of outbursts of η Carinae in 1840–1860. The regular, line-driven stellar winds can only explain a mass loss rate of around 10~10 solar masses per year, whereas losses of up to ⁠ 1 / 2 ⁠ solar mass per year are needed to understand the η Carinae outbursts. This can be done with the help of the super-Eddington winds driven by broad-spectrum radiation.

Gamma-ray bursts, novae and supernovae are examples of systems exceeding their Eddington luminosity by a large factor for very short times, resulting in short and highly intensive mass loss rates. Some X-ray binaries and active galaxies are able to maintain luminosities close to the Eddington limit for very long times. For accretion-powered sources such as accreting neutron stars or cataclysmic variables (accreting white dwarfs), the limit may act to reduce or cut off the accretion flow, imposing an Eddington limit on accretion corresponding to that on luminosity. Super-Eddington accretion onto stellar-mass black holes is one possible model for ultraluminous X-ray sources (ULXSs).

For accreting black holes, not all the energy released by accretion has to appear as outgoing luminosity, since energy can be lost through the event horizon, down the hole. Such sources effectively may not conserve energy. Then the accretion efficiency, or the fraction of energy actually radiated of that theoretically available from the gravitational energy release of accreting material, enters in an essential way.

Other factors

The Eddington limit is not a strict limit on the luminosity of a stellar object. The limit does not consider several potentially important factors, and super-Eddington objects have been observed that do not seem to have the predicted high mass-loss rate. Other factors that might affect the maximum luminosity of a star include:

  • Porosity. A problem with steady winds driven by broad-spectrum radiation is that both the radiative flux and gravitational acceleration scale with r. The ratio between these factors is constant, and in a super-Eddington star, the whole envelope would become gravitationally unbound at the same time. This is not observed. A possible solution is introducing an atmospheric porosity, where we imagine the stellar atmosphere to consist of denser regions surrounded by regions of lower-density gas. This would reduce the coupling between radiation and matter, and the full force of the radiation field would be seen only in the more homogeneous outer, lower-density layers of the atmosphere.
  • Turbulence. A possible destabilizing factor might be the turbulent pressure arising when energy in the convection zones builds up a field of supersonic turbulence. The importance of turbulence is being debated, however.
  • Photon bubbles. Another factor that might explain some stable super-Eddington objects is the photon bubble effect. Photon bubbles would develop spontaneously in radiation-dominated atmospheres when the radiation pressure exceeds the gas pressure. We can imagine a region in the stellar atmosphere with a density lower than the surroundings, but with a higher radiation pressure. Such a region would rise through the atmosphere, with radiation diffusing in from the sides, leading to an even higher radiation pressure. This effect could transport radiation more efficiently than a homogeneous atmosphere, increasing the allowed total radiation rate. Accretion discs may exhibit luminosities as high as 10–100 times the Eddington limit without experiencing instabilities.

Humphreys–Davidson limit

The upper H–R diagram with the empirical Humphreys-Davidson limit marked (green line). Stars are observed above the limit only during brief outbursts.

Observations of massive stars show a clear upper limit to their luminosity, termed the Humphreys–Davidson limit after the researchers who first wrote about it. Only highly unstable objects are found, temporarily, at higher luminosities. Efforts to reconcile this with the theoretical Eddington limit have been largely unsuccessful.

The H–D limit for cool supergiants is placed at around 320,000 L.

Most luminous known K- and M-type supergiants
Name Luminosity
(L)
Effective temperature
(K)
Spectral type Notes References
NGC1313-310 513,000 3,780 K5-M0
NGC253-222 501,000 3,750 M0-M2 Uncertain extinction and thus uncertain luminosity.
LGGS J013339.28+303118.8 479,000 3,837 M1Ia
Stephenson 2 DFK 49 390,000 4,000 K4 Another paper estimate a much lower luminosity (245,000 L)
HD 269551 A 389,000 3,800 K/M
NGC7793-34 380,000 3,840 M0-M2
LGGS J013418.56+303808.6 363,000 3,837
LGGS J004428.12+415502.9 339,000 K2I
NGC247-154 332,000 3,570 M2-M4
AH Scorpii 331,000 3,682 M5Ia
WLM 02 331,000 4,660 K2-3I
SMC 18592 309,000 - 355,000 4,050 K5–M0Ia
LGGS J004539.99+415404.1 309,000 M3I
LGGS J013350.62+303230.3 309,000 3,800
HV 888 302,000 3,442–3,500 M4Ia
RW Cephei 300,000 4,400 K2Ia-0 A K-type yellow hypergiant.
LGGS J013358.54+303419.9 295,000 4,050
GCIRS 7 295,000 3,600 M1I
SP77 21-12 295,000 4,050 K5-M3
EV Carinae 288,000 3,574 M4.5Ia
HV 12463 288,000 3,550 M Probably not a LMC member.
LGGS J003951.33+405303.7 288,000
LGGS J013352.96+303816.0 282,000 3,900
RSGC1-F13 282,000 - 290,000 3,590 - 4,200 M3 - K2
WOH G64 282,000 3,400 M5I Likely the largest known star.
LGGS J004731.12+422749.1 275,000
VY Canis Majoris 270,000 3,490 M3–M4.5
Mu Cephei 269,000+111,000
−40,000
3,750 M2 Ia
LGGS J004428.48+415130.9 269,000 M1I
RSGC1-F01 263,000 - 335,000 3,450 M5
NGC247-155 263,000 3,510 M2-M4 Uncertain extinction and thus uncertain luminosity.
LGGS J013241.94+302047.5 257,000 3,950
NGC300-125 257,000 3,350 M2-M4
Westerlund 1 W26 256,000 - 312,000 3,720 - 4,000 M0.5-M6Ia
HD 143183 254,000 3,605 M3
LMC 145013 251,000 - 339,000 3,950 M2.5Ia–Ib
LMC 25320 251,000 3,800 M
V354 Cephei 250,000 3,615 M1Ia-M3.5Ib

See also

References

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Further reading

  • Frank, Juhan; King, Andrew; Raine, Derek (2002). Accretion Power in Astrophysics (3rd ed.). Cambridge University Press. ISBN 0-521-62957-8.

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