Jump to content

Moffat distribution

From Wikipedia, the free encyclopedia
(Redirected from Moffat function)

The Moffat distribution, named after the physicist Anthony Moffat, is a continuous probability distribution based upon the Lorentzian distribution. Its particular importance in astrophysics is due to its ability to accurately reconstruct point spread functions, whose wings cannot be accurately portrayed by either a Gaussian or Lorentzian function.

Characterisation

[edit]

Probability density function

[edit]

The Moffat distribution can be described in two ways. Firstly as the distribution of a bivariate random variable (X,Y) centred at zero, and secondly as the distribution of the corresponding radii In terms of the random vector (X,Y), the distribution has the probability density function (pdf) where and are seeing dependent parameters. In this form, the distribution is a reparameterisation of a bivariate Student distribution with zero correlation.

In terms of the random variable R, the distribution has density

Relation to other distributions

[edit]

References

[edit]