Abstract
A new approach to robust linear filter design is described that attempts to combine the advantages of H/sub /spl infin// robust linear synthesis with a probabilistic method of system and noise modeling. The signal and measurement noise model parameters are assumed to be subject to perturbations represented by random variables with known covariances. The system is represented in polynomial form, and the uncertainty can be described by both soft and hard bounds. An H/sub /spl infin// cost-function is minimized and averaged with respect to model errors in signal and noise descriptions. The polynomial solution is no more complicated than the usual H/sub /spl infin// optimal filter and involves averaged spectral factorizations and linear equations. Both usual and deconvolution filtering problems are considered.
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