State estimation for multi‐channel stochastic singular systems with multiplicative noise

Abstract: The state estimation problem for multi‐channel singular systems with multiplicative noise is considered based on singular value decomposition. First, two equivalent reduced order subsystems are obtained via the decomposition. Then, in order to solve the estimation problem, the subsystems are rewritten into a new form. It is noted that the measurement noise here becomes colored noise, which contains the dynamic noise, measurement noise, and multiplicative noise of the original system. In this situation, existin… Show more

“…For linear descriptor systems with multiplicatives, some references have presented important results [14][15][16]. Furthermore, for delayed descriptor systems with multiplicative noises, there are also some important references which have given results, e.g., [12] has given the fixed-point smoother for descriptor systems with multiplicative noises and single delayed measurements.…”

Optimal FSL smoothing for delayed descriptor systems

“…For linear descriptor systems with multiplicatives, some references have presented important results [14][15][16]. Furthermore, for delayed descriptor systems with multiplicative noises, there are also some important references which have given results, e.g., [12] has given the fixed-point smoother for descriptor systems with multiplicative noises and single delayed measurements.…”

Optimal FSL smoothing for delayed descriptor systems

“…However, the above references mainly focus on networks without multiplicative noises, and they can't be useful when there are multiplicative noises in the system models. For the problems of multiplicative noises, some results have been given, see [13], [14], [15], [20]. Particularly, [13] considers the optimal filtering for continuous-time systems with delayed measurements and multiplicative noise.…”

Kalman filtering for multiple-delay wireless network systems with multiplicative noises

“…The optimal smoothing problem has received much attention these years [9,10,12,13]. For the optimal smoothing of descriptor systems with multiplicatives, some researchers have given some important results [14][15][16], where Kalman filtering and standard decomposition are to study the optimal estimation of the descriptor systems.…”

On Fixed-Point Smoothing for Descriptor Systems with Multiplicative Noise and Single Delayed Observations