Global feedback stabilization of new class of bilinear systems

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

In this paper, we investigate global stabilization of nonsmooth systems. The aim is to provide su cient condition, based on standard derivative, for feedback stabilization of nonsmooth systems by means of a feedback of class C r (r ¿ 1). The main result is a generalization of a result, concerning sm

In this paper, we deal with the problem of stabilization of homogeneous bilinear systems. The aim is to clarify some results on stabilizability of these systems.

Abstract~This paper gives a necessary and sufficient condition for global stabilization of quadratic systems in R" as well as the stabilizing feedbacks which are written under invariant form.

In this paper, the problem of output-feedback stabilization is investigated for the first time for a class of stochastic nonlinear systems whose zero dynamics may be unstable. Under the assumption that the inverse dynamics of the system is stochastic input-to-state stabilizable, a stabilizing output