Geometric albedo

In astronomy, the geometric albedo of a celestial body is the ratio of its actual brightness as seen from the light source (i.e. at zero phase angle) to that of an idealized flat, fully reflecting, diffusively scattering (Lambertian) disk with the same cross-section. (This phase angle refers to the direction of the light paths and is not a phase angle in its normal meaning in optics or electronics.)

Diffuse scattering implies that radiation is reflected isotropically with no memory of the location of the incident light source. Zero phase angle corresponds to looking along the direction of illumination. For Earth-bound observers this occurs when the body in question is at opposition and on the ecliptic.

The visual geometric albedo refers to the geometric albedo quantity when accounting for only electromagnetic radiation in the visible spectrum.

Airless bodies

The surface materials (regoliths) of airless bodies (in fact, the majority of bodies in the Solar System) are strongly non-Lambertian and exhibit the opposition effect, which is a strong tendency to reflect light straight back to its source, rather than scattering light diffusely.

The geometric albedo of these bodies can be difficult to determine because of this, as their reflectance is strongly peaked for a small range of phase angles near zero.[1] The strength of this peak differs markedly between bodies, and can only be found by making measurements at small enough phase angles. Such measurements are usually difficult due to the necessary precise placement of the observer very close to the incident light. For example, the Moon is never seen from the Earth at exactly zero phase angle, because then it is being eclipsed. Other Solar System bodies are not in general seen at exactly zero phase angle even at opposition, unless they are also simultaneously located at the ascending or descending node of their orbit, and hence lie on the ecliptic. In practice, measurements at small nonzero phase angles are used to derive the parameters which characterize the directional reflectance properties for the body (Hapke parameters). The reflectance function described by these can then be extrapolated to zero phase angle to obtain an estimate of the geometric albedo.

For very bright, solid, airless objects such as Saturn's moons Enceladus and Tethys, whose total reflectance (Bond albedo) is close to one, a strong opposition effect combines with the high Bond albedo to give them a geometric albedo above unity (1.4 in the case of Enceladus). Light is preferentially reflected straight back to its source even at low angle of incidence such as on the limb or from a slope, whereas a Lambertian surface would scatter the radiation much more broadly. A geometric albedo above unity means that the intensity of light scattered back per unit solid angle towards the source is higher than is possible for any Lambertian surface.

Equivalent definitions

For the hypothetical case of a plane surface, the geometric albedo is the albedo of the surface when the illumination is provided by a beam of radiation that comes in perpendicular to the surface.

Examples

The geometric albedo may be greater or smaller than the Bond albedo, depending on surface and atmospheric properties of the body in question. Some examples:[2]

Name Bond albedo Visual geometric albedo
Mercury[3] 0.068 0.068
 
0.142 0.142
 
Venus[4] 0.90 0.9
 
0.67 0.67
 
Earth[5] 0.306 0.306
 
0.367 0.367
 
Moon[6] 0.11 0.11
 
0.12 0.12
 
Mars[7] 0.25 0.25
 
0.15 0.15
 
Jupiter[8] 0.343 0.343
 
0.52 0.52
 
Saturn[9] 0.342 0.342
 
0.47 0.47
 
Enceladus[10] 0.8 0.8
 
1.4 1.4
 
Uranus[11] 0.300 0.3
 
0.51 0.51
 
Neptune[12] 0.290 0.29
 
0.41 0.41
 
Pluto 0.4 0.4
 
0.440.61 0.44
 
 
Eris 0.96 0.96
 

See also

References

  • NASA JPL glossary
  • K.P. Seidelmann, Ed. (1992) Explanatory Supplement to the Astronomical Almanac, University Science Books, Mill Valley, California.
  1. See for example this discussion of Lunar albedo Archived April 13, 2009, at the Wayback Machine. by Jeff Medkeff.
  2. Albedo of the Earth
  3. Williams, David R. (2014-05-09). "Mercury Fact Sheet". NASA. Retrieved 2015-03-02.
  4. Mallama, A.; Wang, D.; Howard, R.A. (2006). "Venus phase function and forward scattering from H2SO4". Icarus. 182: 10–22. Bibcode:2006Icar..182...10M. doi:10.1016/j.icarus.2005.12.014.
  5. Williams, David R. (2004-09-01). "Earth Fact Sheet". NASA. Retrieved 2010-08-09.
  6. Williams, David R. (2014-04-25). "Moon Fact Sheet". NASA. Retrieved 2015-03-02.
  7. Mars Fact Sheet, NASA
  8. Jupiter Fact Sheet, NASA
  9. Saturn Fact Sheet, NASA
  10. See the discussion here for explanation of this unusual value above one.
  11. Uranus Fact Sheet, NASA
  12. Neptune Fact Sheet, NASA
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