Reliable computation of H∞ central controllers near the optimum

The state-space formulas for the usual H<sub>∞</sub> central controller become singular when approaching the optimum γ<sub>opt</sub>. A new approach is taken to circumvent this difficulty. It consists of extending the notion of central controller to include proper controllers with a feedthrough term. While such controllers are still derived from the usual Riccati solutions X<sub>∞</sub>, and Y<sub>∞</sub>, their feedthrough gain can be selected so as to neutralize the singularities near γ<sub>opt</sub>. This provides numerically stable formulas for the controller parameters and eliminates the discontinuity between the realizations of nearly optimal and of reduced-order optimal central controllers. The advantages of this method are illustrated on a few examples.