Bilinear optimal control of a Kirchhoff plate

We consider the problem of driving a Kirchhoff plate towards a desired state or profile at a final time ¹ while taking into account a quadratic cost of implementing the control. The control enters the equation as a bilinear term in the state equation. Our purpose is to prove that an optimal control

This paper deals with the time-varying bilinear quadratic optimal control problem. Using Adomian's decomposition method, we shall first derive a functional expansion for the input-output map of the system, then transform the cost functional so that it yields the optimal control in a recursive manner

The optimization of the time-invariant bilinear weakly coupled system with a quadratic performance criterion is considered. A sequence of linear state and costate equations is constructed such that the open-loop solution of the optimization problem is obtained in terms of the reduced-order subsystem