Title :
Average likelihood function and higher-order statistics
Author :
Le Martret, Christophe
Author_Institution :
CELAR, DGA, Bruz, France
Abstract :
This paper deals with the approximation of the average likelihood function (ALF) in the Gaussian context. This function is obtained by averaging the likelihood function (LF) over all the random parameters for which a probability density function (PDF) is assumed to be known. We show that it is possible to express the ALF by a power series expansion which involves higher-order statistics (HOS). The obtained expression turns to be a weighted sum of the cross-correlation between some “integrated moments” of the reference signal and estimated moments of the observation. This expression leads to practical tests and allows us to solve many classification and estimation problems. As an application we derive here the fourth-order multicycle detector
Keywords :
Gaussian distribution; correlation theory; higher order statistics; parameter estimation; series (mathematics); signal classification; signal detection; Gaussian approximation; HOS; average likelihood function; classification; cross-correlation; estimated moments; fourth-order multicycle detector; higher-order statistics; integrated moments; power series expansion; probability density function; random parameters; weighted sum; Bayesian methods; Detectors; Equations; Gaussian noise; Genetic expression; Higher order statistics; Probability density function; Testing;
Conference_Titel :
Higher-Order Statistics, 1999. Proceedings of the IEEE Signal Processing Workshop on
Conference_Location :
Caesarea
Print_ISBN :
0-7695-0140-0
DOI :
10.1109/HOST.1999.778696
