Title :
Analytic Sequential Weiss–Weinstein Bounds
Author :
Xaver, F. ; Gerstoft, P. ; Matz, Gerald ; Mecklenbrauker, Christoph F.
Author_Institution :
Inst. of Telecommun. (ICT), Vienna Univ. of Technol., Vienna, Austria
Abstract :
In this paper, we explore a sequential Bayesian bound for state-space models focusing on hybrid continuous and discrete random states. We provide an analytic recursion for the sequential Weiss-Weinstein (SWW) bound for linear state-space models with solutions for Gaussian, uniform, and exponential distributions as derived, as well as for a combination of these. We compare the SWW bound for discretized states with the corresponding bound for the continuous states. The SWW bound is contrasted with the sequential Cramér-Rao bound for Gaussian distributions. Practical issues of SWW bounds are discussed and numerical simulation results provide insights into their behavior.
Keywords :
Bayes methods; Gaussian distribution; exponential distribution; state-space methods; Gaussian distributions; SWW bound; analytic recursion; analytic sequential Weiss-Weinstein bounds; exponential distributions; hybrid continuous-discrete random states; linear state-space models; numerical simulation; sequential Bayesian bound; sequential Cramer-Rao bound; state-space models; uniform distributions; Bayes methods; Mathematical model; Mean square error methods; Noise; Sea measurements; State-space methods; Vectors; Analytic sequential Weiss–Weinstein lower bound; Bayesian estimation; Gaussian distributions; exponential distributions; uniform distributions;
Journal_Title :
Signal Processing, IEEE Transactions on
DOI :
10.1109/TSP.2013.2273886
