Title :
A geometric approach to the reciprocal realization problem
Author_Institution :
Karolinska Tech. Inst., Stockholm, Sweden
Abstract :
A reciprocal realization of a stationary process {y(t )} is a stochastic system of the form y(t)=Cx (t), Mx(t)=N´x(t -1)+Nx(t+1)+e(t), where the state process {x(t)} is a reciprocal process. The minimality and observability of reciprocal realizations are analyzed by geometric methods analogous to those of A. Lindquist and G. Picci (1985). In particular, the concept of splitting subspaces plays a central role
Keywords :
observability; stochastic systems; geometric approach; minimality; observability; reciprocal realization problem; splitting subspaces; stationary process; stochastic system; Arithmetic; Covariance matrix; Educational Activities Board; Equations; Gaussian processes; Hilbert space; Observability; Random variables; Stacking; Stochastic systems;
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.1992.370961
