Title :
CRLB under K-distributed observation with parameterized mean
Author :
El korso, Mohammed Nabil ; Renaux, Alexandre ; Forster, Philippe
Author_Institution :
IUT de Ville d´Avray, Univ. Paris-Ouest X, Ville-d´Avray, France
Abstract :
A semi closed-form expression of the Fisher information matrix in the context of K-distributed observations with parameterized mean is given and related to the classical, i.e. Gaussian case. This connection is done via a simple multiplicative factor, which only depends on the intrinsic parameters of the texture and the size of the observation vector. Finally, numerical simulation is provided to corroborate the theoretical analysis.
Keywords :
estimation theory; matrix algebra; vectors; CRLB; Cramér-Rao lower bound; Fisher information matrix; Gaussian case; K-distributed observation; multiplicative factor; numerical simulation; observation vector; parameterized mean; Arrays; Clutter; Context; Covariance matrices; Noise; Vectors;
Conference_Titel :
Sensor Array and Multichannel Signal Processing Workshop (SAM), 2014 IEEE 8th
Conference_Location :
A Coruna
DOI :
10.1109/SAM.2014.6882442
