AbstractWe present a method for analysing the deviation in transient behaviour between two parameterised families of nonlinear ODEs, as initial conditions and parameters are varied within compact sets over which stability is guaranteed. This deviation is taken to be the integral over time of a user-specified, positive definite function of the difference between the trajectories, for instance the L2 norm. We use sum-of-squares programming to obtain two polynomials, which take as inputs the (possibly differing) initial conditions and parameters of the two families of ODEs, and output upper and lower bounds to this transient deviation. Equality can be achieved using symbolic methods in a special case involving Linear Time Invariant Parameter D...
A numerical algorithm for computing necessary conditions for performance specifications is developed...
<p>Ordinary differential equations (ODE) are routinely calibrated on real data for estimating unknow...
Thesis: Ph. D., Massachusetts Institute of Technology, Department of Electrical Engineering and Comp...
We propose a computational method for local robust performance analysis of nonlinear systems with po...
We use Lyapunov-like functions and convex optimization to propagate uncertainty in the initial condi...
This thesis investigates performance analysis for nonlinear systems, which consist of both known and...
In this dissertation we propose a control synthesis and analysis framework for nonlinear, and neural...
This thesis introduces, develops and applies methods for analysing nonlinear systems with the multip...
For nonlinear systems that satisfy certain regularity conditions it is shown that upper and lower bo...
A novel approach is introduced to assess stability of nonlinear systems in the presence of parameter...
In this thesis, we consider plants with uncertain parameters where those parameters may be time-vary...
In this paper, we develop algorithms for the computational analysis of stability and robust performa...
AbstractFor models frequently encountered in system dynamics a method is derived to find the directi...
This paper is concerned with the high-performance robust control of discrete-time linear time-invari...
The operator T from a domain D into the space of measurable functions is called a nonanticipating op...
A numerical algorithm for computing necessary conditions for performance specifications is developed...
<p>Ordinary differential equations (ODE) are routinely calibrated on real data for estimating unknow...
Thesis: Ph. D., Massachusetts Institute of Technology, Department of Electrical Engineering and Comp...
We propose a computational method for local robust performance analysis of nonlinear systems with po...
We use Lyapunov-like functions and convex optimization to propagate uncertainty in the initial condi...
This thesis investigates performance analysis for nonlinear systems, which consist of both known and...
In this dissertation we propose a control synthesis and analysis framework for nonlinear, and neural...
This thesis introduces, develops and applies methods for analysing nonlinear systems with the multip...
For nonlinear systems that satisfy certain regularity conditions it is shown that upper and lower bo...
A novel approach is introduced to assess stability of nonlinear systems in the presence of parameter...
In this thesis, we consider plants with uncertain parameters where those parameters may be time-vary...
In this paper, we develop algorithms for the computational analysis of stability and robust performa...
AbstractFor models frequently encountered in system dynamics a method is derived to find the directi...
This paper is concerned with the high-performance robust control of discrete-time linear time-invari...
The operator T from a domain D into the space of measurable functions is called a nonanticipating op...
A numerical algorithm for computing necessary conditions for performance specifications is developed...
<p>Ordinary differential equations (ODE) are routinely calibrated on real data for estimating unknow...
Thesis: Ph. D., Massachusetts Institute of Technology, Department of Electrical Engineering and Comp...