Maximal lyapunov functions and domains of attraction for autonomous nonlinear systems

In this paper we provide guaranteed stability regions for multivariable Lure´-type systems. Specifically, using the Lure´-Postnikov Lyapunov function a guaranteed subset of the domain of attraction for a feedback system whose forward path contains a dynamic linear time-invariant system and whose fee

In 8 , the authors used normal form theory to construct Lyapunov functions for critical nonlinear systems in normal form coordinates. In this work, the authors expand on those ideas by providing a method for constructing the associated normal form transformations that gives rise to the systematic de

This paper deals with the estimation of a robust domain of attraction for nonlinear systems with structured uncertainties. For this goal a piecewise constant parameter-dependent Lyapunov function is used. This type of a Lyapunov function is based on dividing the uncertainty bounding set into a "nite

Functional series are the basis of much of existing nonlinear system theory. The present note extends the well-known local series beyond its radius of convergence to describe the entire system trajectory (for as long as it exists). First steps towards a generalization to systems defined on analytic