spectroscopy Spectroscopy is the field of study that measures and interprets the electromagnetic spectra that result from the interaction between electromagnetic radiation and matter as a function of the wavelength or frequency of the radiation. Matter wa ...

and

radiometry Radiometry is a set of techniques for measurement, measuring electromagnetic radiation, including visible light. Radiometric techniques in optics characterize the distribution of the radiation's power (physics), power in space, as opposed to phot ...

, vector radiative transfer (VRT) is a method of modelling the propagation of polarized

electromagnetic radiation In physics, electromagnetic radiation (EMR) consists of waves of the electromagnetic field, electromagnetic (EM) field, which propagate through space and carry momentum and electromagnetic radiant energy. It includes radio waves, microwaves, inf ...

in low density media. In contrast to

scalar Scalar may refer to: *Scalar (mathematics), an element of a field, which is used to define a vector space, usually the field of real numbers * Scalar (physics), a physical quantity that can be described by a single element of a number field such ...

radiative transfer Radiative transfer is the physical phenomenon of energy transfer in the form of electromagnetic radiation. The propagation of radiation through a medium is affected by absorption, emission, and scattering processes. The equation of radiative tran ...

(RT), which models only the first Stokes component, the intensity, VRT models all four components through

vector Vector most often refers to: *Euclidean vector, a quantity with a magnitude and a direction *Vector (epidemiology), an agent that carries and transmits an infectious pathogen into another living organism Vector may also refer to: Mathematic ...

methods. For a single frequency,

\nu

, the VRT equation for a scattering media can be written as follows: :

\frac= - \mathbf K \vec I + \vec a B(\nu, T)
 + \int_ \mathbf Z(\hat n, \hat n^\prime, \nu) \vec I \mathrm d \hat n^\prime

where ''s'' is the path,

\hat n

is the propagation vector, ''K'' is the extinction matrix,

\vec a

is the absorption vector, ''B'' is the

Planck function In physics, Planck's law describes the spectral density of electromagnetic radiation emitted by a black body in thermal equilibrium at a given temperature , when there is no net flow of matter or energy between the body and its environment. At ...

and ''Z'' is the scattering phase matrix. All the coefficient matrices, ''K'',

\vec a

and ''Z'', will vary depending on the density of absorbers/scatterers present and must be calculated from their density-independent quantities, that is the

attenuation coefficient The linear attenuation coefficient, attenuation coefficient, or narrow-beam attenuation coefficient characterizes how easily a volume of material can be penetrated by a beam of light, sound, particles, or other energy or matter. A coefficient valu ...

vector,

\vec a

, is calculated from the

mass absorption coefficient The mass attenuation coefficient, or mass narrow beam attenuation coefficient of a material is the attenuation coefficient normalized by the density of the material; that is, the attenuation per unit mass (rather than per unit of distance). Thus, i ...

vector times the density of the absorber. Moreover, it is typical for media to have multiple species causing extinction, absorption and scattering, thus these coefficient matrices must be summed up over all the different species. Extinction is caused both by simple

absorption Absorption may refer to: Chemistry and biology * Absorption (biology), digestion **Absorption (small intestine) *Absorption (chemistry), diffusion of particles of gas or liquid into liquid or solid materials *Absorption (skin), a route by which ...

as well as from scattering out of the line-of-sight,

\hat n

, therefore we calculate the extinction matrix from the combination of the absorption vector and the scattering phase matrix: :

\mathbf K(\hat n, \nu) = \vec a(\nu)\mathbf I + \int_ \mathbf Z(\hat n^\prime, \hat n, \nu) \mathrm d \hat n^\prime

where I is the identity matrix. The four-component radiation vector,

\vec I = (I, Q, U, V)

where ''I'', ''Q'', ''U'' and ''V'' are the first through fourth elements of the

Stokes parameters The Stokes parameters are a set of values that describe the polarization state of electromagnetic radiation. They were defined by George Gabriel Stokes in 1852, as a mathematically convenient alternative to the more common description of incoher ...

, respectively, fully describes the polarization state of the electromagnetic radiation. It is this vector-nature that considerably complicates the equation. Absorption will be different for each of the four components, moreover, whenever the radiation is scattered, there can be a complex transfer between the different Stokes components—see polarization mixing—thus the scattering phase function has 4*4=16 components. It is, in fact, a rank-two

tensor In mathematics, a tensor is an algebraic object that describes a multilinear relationship between sets of algebraic objects related to a vector space. Tensors may map between different objects such as vectors, scalars, and even other tenso ...

References

* {{cite thesis , author=Claudia Emde , institution=University of Bremen , title=A polarized discrete ordinate scattering model for radiative transfer simulations in spherical atmospheres with thermal source , url=http://www.sat.ltu.se/members/claudia/publications/thesis.pdf, year=2004 Radiometry Spectroscopy Electromagnetic radiation