Stable inversion for nonlinear nonminimum-phase time-varying systems

In this paper, we extend stable inversion to nonlinear time-varying systems and study computational issues-the technique is applicable to minimum-phase as well as nonminimum-phase systems, The inversion technique is new, even in the linear time-varying case, and relies on partitioning (the dichotomic split of) the linearized system dynamics into time-varying, stable, and unstable, submanifolds. This dichotomic split is used to build time-varying filters which are, in turn, the basis of a contraction used to find a bounded inverse input-state trajectory, Finding the inverse input-state trajectory allows the development of exact-output tracking controllers. The method is local to the time-varying trajectory and requires that the internal dynamics vary slowly; however, the method represents a significant advance relative to presently available tracking controllers. Present techniques are restricted to time-invariant nonlinear systems and, in the general case, track only asymptotically.