An operatorial approach of the well-posedness of an algebraic Riccati equation

Abstract

Finding the state feedback control in an % H∞ -optimal control problem involves a challenging approach of the associated algebraic Riccati equation of the generic form A P+PA+P P=F. In view of this objective, we explore in this paper the existence of the solution to this algebraic Riccati equation by a direct operatorial approach in the space of Hilbert-Schmidt operators. The proofs are provided, under certain assumptions on the operators and F, for the cases with A coercive and A≥ 0, respectively. They develop a constructive approach, possibly indicating a method for finding the numerical solution. Next, relying on the existence of the solution to the Riccati equation, we provide then a result concerning the associated % H∞ -optimal control problem. An example regarding the application of the existence proof for the solution to the Riccati equation is given for a parabolic equation with a singular potential of Hardy type.