H∞ optimization problem with sign-indefinite quadratic form

Abstract

This paper presents the solution to min-max control problem arising when the matrix C 1 T C 1 of the cost function in the standard H ∞ control problem (Doyle et al., 1989) is replaced by an arbitrary matrix Q ≱ 0. This difference is proved to be sufficient for results obtained in (Doyle et al., 1989) not to cover such the case. Their derivations essentially base on the cost function being H ∞ norm and can not be adjusted to deal with sign-indefinite quadratic form. With some sort of strict frequency condition assumed, state space technique is fruitful to obtain the necessary and sufficient conditions of the solvability of the problem. The solution is given by two Riccati equations and has some difference when compared to that of (Doyle et al., 1989).