BIBO Stability of the Discrete Bilinear System

In this paper, we study stabilizing controllers for time varying bilinear systems. Here, the feedback function, f in our paper is for larger classes than those given in the current literature. We establish existence theorems for stabilizing bilinear systems by output feedback from a large class. The

In this paper we derive a set of conditions which are both necessary and sufficient for complete controllability of a class of inhomogeneous discrete time bilinear systems.

Optimal control of a class of time invariant singleinput, discrete bilinear systems is investigated in this paper. Both deterministic and stochastic problems are considered. In the deterministic problem, for the initial state in a certain set £0, the solution is the same as the solution to the asso

This paper studies local stabilization of a class of analytic nonlinear systems in terms of, which includes ordinary bilinear systems as its subset, zR "f (z)#g(z)u, f (0)"0, g(0)"0, z3R which can be achieved via a feedback control law u"u(z) with u(0)"0. Following the theoretical results a potentia

Stabilizing and optimizing feedback control policies are derived for the important class of bilinear systems with generalized quadratric cost functions. These policies as well as the resulting optimal costs are quadratic in the state. The optimal cost function is shown to be a Lyapunov function for