Solution to nonsingular H2 optimal control problem with unstable weights

In this paper a numerical solution is obtained to the problem of minimizing an H -type cost subject to an H -norm constraint. The method employed is based on the convex alternating projection algorithm and generalizes a recent technique to the multivariable case. The solution is derived in terms of

## Abstract A polynomial matrix solution to the H~2~ output feedback optimal control problems is obtained for systems represented in state‐equation form. The proof does not invoke the separation principle but is obtained in the __z__‐domain. The cost function includes weighted states, which allows

The paper proposes a two-stage design approach to optimal H 2 and H= decentralized control problems. In the first stage, an optimal centralized controller is computed. Then in the second stage, based on the optimization results for centralized controllers, the parameter that decentralizes the contro

We establish regularity properties of solutions of linear quadratic optimal control problems involving state inequality constraints. Under simply stated and directly verifiable hypotheses on the data, it is shown that if the state constraint has index k > 0 then the o ~timal control ~ is k times dif