Title :
Least-informative Bayesian prior distributions for finite samples based on information theory
Author :
Spall, James C. ; Hill, Stacy D.
Author_Institution :
Appl. Phys. Lab., Johns Hopkins Univ., Laurel, MD, USA
fDate :
5/1/1990 12:00:00 AM
Abstract :
A procedure is presented, based on Shannon information theory, for producing least-informative prior distributions for Bayesian estimation and identification. This approach relies on constructing an optimal mixture distribution and applies in small sample sizes (unlike certain approaches based on asymptotic theory). The procedure is illustrated in a small-scale numerical study and is contrasted with an approach based on maximum entropy
Keywords :
Bayes methods; estimation theory; identification; information theory; Bayesian estimation; Shannon; finite samples; identification; information theory; least-informative prior distributions; maximum entropy; Bayesian methods; Computer aided software engineering; Control systems; Error correction; H infinity control; Information theory; Optimal control; Process design; Steady-state; Thumb;
Journal_Title :
Automatic Control, IEEE Transactions on
