This thesis introduces, develops and applies methods for analysing nonlinear systems with the multiple challenges of time-varying, non-polynomial, uncertain or large-scale proper- ties. Both computational and analytic methods using Lyapunov functions are developed and the methods are applied to a range of examples. Generalised Absolute stability is introduced, which is a method of treating polynomial systems with non polynomial, uncertain or time-varying feedback. Analysis is completed with Sum of Squares programming, and this method extends both the applicability of sum of squares as well as existing absolute stability theory. Perturbation methods for invariant Sum of Squares and Semidefinite programs are introduced, which significantly im...
The dynamics of many systems from physics, economics, chemistry, and biology can be modelled through...
This paper presents a sum of squares (SOS) approach to the stability analysis of networked control s...
The paper proposes a numerical algorithm for constructing piecewise linear Lyapunov functions for in...
This paper introduces a general framework for analysing nonlinear systems using absolute stability t...
This paper introduces a general framework for analysing systems that have non-polynomial, uncertain ...
The sum of squares (SOS) decomposition technique allows numerical methods such as semidefinite progr...
The use of the sum of squares decomposition and semidefinite programming have provided an efficient ...
Recent advances in semidefinite programming along with use of the sum of squares decomposition to ch...
The use of the sum of squares decomposition and semidefinite programming have provided an efficient ...
Summary. Recent advances in semidefinite programming along with use of the sum of squares decomposit...
A relaxation of Lyapunov's direct method has been proposed elsewhere that allows for an algorithmic ...
The book investigates stability theory in terms of two different measure, exhibiting the advantage o...
In this paper the stability analysis of nonlinear systems is studied through different approaches. T...
Abstract — This tutorial is about new system analysis techniques that were developed in the past few...
This tutorial is about new system analysis techniques that were developed in the past few years base...
The dynamics of many systems from physics, economics, chemistry, and biology can be modelled through...
This paper presents a sum of squares (SOS) approach to the stability analysis of networked control s...
The paper proposes a numerical algorithm for constructing piecewise linear Lyapunov functions for in...
This paper introduces a general framework for analysing nonlinear systems using absolute stability t...
This paper introduces a general framework for analysing systems that have non-polynomial, uncertain ...
The sum of squares (SOS) decomposition technique allows numerical methods such as semidefinite progr...
The use of the sum of squares decomposition and semidefinite programming have provided an efficient ...
Recent advances in semidefinite programming along with use of the sum of squares decomposition to ch...
The use of the sum of squares decomposition and semidefinite programming have provided an efficient ...
Summary. Recent advances in semidefinite programming along with use of the sum of squares decomposit...
A relaxation of Lyapunov's direct method has been proposed elsewhere that allows for an algorithmic ...
The book investigates stability theory in terms of two different measure, exhibiting the advantage o...
In this paper the stability analysis of nonlinear systems is studied through different approaches. T...
Abstract — This tutorial is about new system analysis techniques that were developed in the past few...
This tutorial is about new system analysis techniques that were developed in the past few years base...
The dynamics of many systems from physics, economics, chemistry, and biology can be modelled through...
This paper presents a sum of squares (SOS) approach to the stability analysis of networked control s...
The paper proposes a numerical algorithm for constructing piecewise linear Lyapunov functions for in...