Title :
Optimal filters for bilinear systems with nilpotent Lie algebras
Author :
Chikte, Shirish D. ; Lo, James Ting-ho
Author_Institution :
University of Rochester, Rochester, NY, USA
fDate :
12/1/1979 12:00:00 AM
Abstract :
We consider a bilinear signal process driven by a Gauss-Markov process which is observed in additive, white, Gaussian noise. An exact stochastic differential equation for the least squares filter is derived when the Lie algebra associated with the signal process is nilpotent. It is shown that the filter is also bilinear and moreover that it satisfies an analogous nilpotency condition. Finally, some special cases and an example are discussed, indicating ways of reducing the filter dimensionality.
Keywords :
Bilinear systems, stochastic continuous-time; Least-squares estimation; Lie algebras; State estimation; Additive noise; Additive white noise; Algebra; Differential equations; Filters; Gaussian noise; Least squares methods; Nonlinear systems; Signal processing; Stochastic resonance;
Journal_Title :
Automatic Control, IEEE Transactions on
DOI :
10.1109/TAC.1979.1102190
