Subindependence

In probability theory and statistics, subindependence is a weak form of independence.

Two random variables X and Y are said to be subindependent if the characteristic function of their sum is equal to the product of their marginal characteristic functions. Symbolically:


\varphi_{X+Y}(t) = \varphi_X(t)\cdot\varphi_Y(t). \,

This is a weakening of the concept of independence of random variables, i.e. if two random variables are independent then they are subindependent, but not conversely. If two random variables are subindependent, and if their covariance exists, then they are uncorrelated.[1]

Subindependence has some peculiar properties: for example, there exist random variables X and Y that are subindependent, but X and αY are not subindependent when α  1[1] and therefore X and Y are not independent.

Notes

  1. 1 2 Hamedani & Volkmer (2009)

References

Further reading

This article is issued from Wikipedia - version of the Monday, November 24, 2014. The text is available under the Creative Commons Attribution/Share Alike but additional terms may apply for the media files.