H∞-norm bounds for ARE-based designs

Let IIAllp,q be the norm induced on the matrix A with n rows and m columns by the Hijlder lP and d, norms on R" and Rm (or C" and C"'), respectively. It is easy to find an upper bound for the ratio llA/l,,/ilA &y. In this paper we study the classes of matrices for which the upper bound is attained.

We derive bounds on the parameters of systems represented by a transfer functions such that a system satisfying these bounds will satisfy a bound on the H -norm of the uncertainty in a given nominal system. We develop the bound and give examples for illustration.

In this paper, we consider the problems of robust stability and control for the class of uncertain discrete-time linear systems with Frobenius norm-bounded parameter uncertainties in all matrices of the system and output equations. Necessary and su$cient conditions for the above problems are propose

This note addresses a defect occurring in ''Finite-time H 1 control for linear continuous system with norm-bounded disturbance'', which can't ensure the system H 1 finite-time bounded with a prescribed noise attenuation level c. The corrected results and new simulation results are given in this note