Title :
Discrete-time algebraic Riccati equation arising in H∞ filtering problem
Author :
Takaba, Kiyotsugu ; Katayama, Tohru
Author_Institution :
Dept. of Appl. Math. & Phys., Kyoto Univ., Japan
Abstract :
A necessary and sufficient condition for the H∞ filtering problem to be solvable is that the H∞ algebraic Riccati equation (ARE) has a positive semi-definite stabilizing solution with an additional condition that a certain matrix is positive definite. It is shown that such a solution is a monotonically non-increasing convex function of the prescribed H∞ norm bound γ. Moreover, in this paper, the degree of freedom contained in the H∞ filter is investigated based upon this property of the Riccati solution. It turns out that the degree of freedom reduces to zero as γ tends to the optimal value in a certain case. These results provide a guideline for the design of an H∞ filter
Keywords :
H∞ optimisation; Riccati equations; discrete time systems; eigenvalues and eigenfunctions; filtering theory; linear systems; stability; state estimation; state-space methods; transfer function matrices; H∞ filtering; H∞ norm bound; algebraic Riccati equation; convex function; discrete-time systems; eigenvalues; linear time invariant system; nonincreasing convex function; semi-definite stabilization; state estimation; state space representation; time invariant systems; transfer matrix; Electronic mail; Filtering; Guidelines; H infinity control; Mathematics; Nonlinear filters; Physics; Riccati equations; State estimation; Sufficient conditions;
Conference_Titel :
Decision and Control, 1995., Proceedings of the 34th IEEE Conference on
Conference_Location :
New Orleans, LA
Print_ISBN :
0-7803-2685-7
DOI :
10.1109/CDC.1995.478797
