Direct method of constructing H2-suboptimal controllers:: Continuous-time systems

An H-2-suboptimal control problem is defined and analyzed. Then, an algorithm called H-2-suboptimal state feedback gain sequence algorithm (Algorithm Al) is developed. Rather than utilizing a perturbation method, which is numerically stiff and computationally prohibitive, Algorithm Al utilizes a direct eigenvalue assignment method to come up with a sequence of H-2-suboptimal state feedback gains. Also, although the sequence of H-2-suboptimal state feedback gains constructed by Algorithm Al depends on a parameter epsilon, the construction procedure itself does not require explicitly the value of the parameter epsilon. Next, attention is focused on constructing a sequence of H-2-suboptimal observer-based measurement feedback controllers. Both full-order as well as reduced-order observer-based controllers are developed. For a given H-2-suboptimal state feedback gain, a sequence of observer gains for either a full-order or reduced-order observer can be constructed by merely dualizing Algorithm Al. The direct method of constructing H-2-suboptimal controllers developed here has a number of advantages over the perturbation method, e.g., it has the ability to design both full-order and reduced-order observer-based controllers while still maintaining throughout the design the computational simplicity of it.