Rice distribution
| Probability density function | |||
| Cumulative distribution function | |||
| Parameters | , distance between the reference point and the center of the bivariate distribution, , scale | ||
|---|---|---|---|
| Support | |||
| CDF | where Q1 is the Marcum Q-function | ||
| Mean | |||
| Variance | |||
| Skewness | (complicated) | ||
| Excess kurtosis | (complicated) | ||
In probability theory, the Rice distribution or Rician distribution (or, less commonly, Ricean distribution) is the probability distribution of the magnitude of a circularly-symmetric bivariate normal random variable, possibly with non-zero mean (noncentral). It was named after Stephen O. Rice (1907–1986).