Title :
Mixed H2/H∞ filtering
Author :
Khargonekar, Pramod P. ; Rotea, Mario A.
Author_Institution :
Dept. of Electr. Eng. & Comput. Sci., Michigan Univ., Ann Arbor, MI, USA
Abstract :
The authors consider the problem of finding a filter or estimator that minimizes a mixed H2/H∞ filtering cost on the transfer matrix from a given noise input to the filtering error subject to a H∞ constraint on the transfer matrix from a second noise input to the filtering error. This problem can be interpreted and motivated in many different ways-for instance, as a problem of optimal filtering in the presence of noise with fixed and known spectral characteristics subject to a bound on the filtering error due to a second noise source whose spectral characteristics are unknown. It is shown that one can come arbitrarily close to the optimal mixed H2/H∞ filtering cost using a standard Luenberger estimator. The problem of finding a suitable Leunberger estimator gain can be converted into a convex optimization problem over a subset of real matrices of dimension n×(n+1)/2+n×p, where n is the state dimension and p the number of measurements
Keywords :
filtering and prediction theory; matrix algebra; optimisation; spectral analysis; Luenberger estimator; convex optimization problem; measurements; mixed H2/H∞ filtering; noise input; optimal filtering; spectral characteristics; transfer matrix; Constraint optimization; Cost function; Estimation error; Filtering; Filtering theory; Filters; Gain measurement; H infinity control; Matrix converters; Noise measurement; State estimation; Steady-state; Stochastic processes; Upper bound; White noise;
Conference_Titel :
Decision and Control, 1992., Proceedings of the 31st IEEE Conference on
Conference_Location :
Tucson, AZ
Print_ISBN :
0-7803-0872-7
DOI :
10.1109/CDC.1992.371381
