On simultaneous H∞ control and strong H∞ stabilization

A state-space-based design method is developed to construct strongly stabilizing controllers for a class of MIMO plants. The problem is reduced to solving an algebraic Riccati equation (ARE) which appears in the solution of a two-block H problem. Strongly stabilizing controllers designed here are of

The set of units is denoted by q/. ,//(SO) denotes the set of matrices whose elements are all in SO. Jt'(q/) denotes the set of unimodular matrices, i.e., the set of all square matrices such that det A ~ q/.

This paper considers the problem of simultaneous H °° control of a finite collection of linear time-invariant systems via a nonlinear digital output feedback controller. The main result is given in terms of the existence of suitable solutions to Riccati algebraic equations and a dynamic programming

Linear quadratic control has been well studied in the past 30 years. 1 This control design approach is based on the assumption that the dynamic model of the system under consideration is exactly known and its disturbances are Gaussian white noises with known statistics. However, Doyle 2 has shown th