The controllability of certain nonlinear planar systems

In this paper infinite-dimensional dynamical systems described by nonlinear abstract differential equations are considered. Using the generalized open mapping theorem sufficient conditions for constrained exact local controllability are formulated and proved. It is generally assumed that the values

Sufficient conditions are derived for controllability of nonlinear Volterra integrodifferential systems. Here the controllability problem is transformed into a fixed point problem for some operator with the help of the notion of the comparison principle and the results are obtained by using the Scha

Relative controllability of nonlinear time-varying systems with time-variable delays in control is considered. Using Schauder's fixed point theorem, sufficient conditions for global relative controllability are given. The results obtained are a generalization of Davison [3], and Klamka [7].

In this paper we introduce a new method to design control laws for nonlinear, underactuated systems. Our method produces an infinite-dimensional family of control laws, whereas most control techniques only produce a finite-dimensional family. These control laws each come with a natural Lyapunov func