This paper shows how Gröbner bases can be used to solve some common problems in nonlinear systems theory efficiently. These problems include finding critical levels of local Lyapunov functions and solving the equations that arise in the harmonic balancing method. The methods proposed are illustrated by some concrete examples in which the computer algebra system Maple is used for performing the necessary calculations
The theory of linear systems has been developed over many years into a unified collection of results...
AbstractSystems of nonlinear algebraic equations (SNAE) are ubiquitous in the many applications requ...
International audienceIn this paper, we show how stabilizing controllers for 2D systems can effectiv...
Some problems within nonlinear control theory are stated and solved using so called Groebner bases f...
The author shows how Gröbner bases can be used when choosing parameters in Lyapunov functions for no...
Some connections between constructive real algebraic geometry and constrained optimization are explo...
A rich collection of analytical tools based on differential geometric methods has been developed for...
In this book several streams of nonlinear control theory are merged and di- rected towards a constru...
A rich collection of analytical tools based on differential geometric methods has been developed for...
This paper will explore the use and construction of Gröbner bases through Buchberger\u27s algorithm....
Symbolic computation, also known as computer algebra, is a powerful tool in solving tough and intric...
A self-contained introduction to algebraic control for nonlinear systems suitable for researchers an...
Symbolic computation, also known as computer algebra, is a powerful tool in solving tough and intric...
The frequency-domain theory of linear systems, including the root locus is generalised to nonlinear ...
The theory of linear systems has been developed over many years into a unified collection of results...
AbstractSystems of nonlinear algebraic equations (SNAE) are ubiquitous in the many applications requ...
International audienceIn this paper, we show how stabilizing controllers for 2D systems can effectiv...
Some problems within nonlinear control theory are stated and solved using so called Groebner bases f...
The author shows how Gröbner bases can be used when choosing parameters in Lyapunov functions for no...
Some connections between constructive real algebraic geometry and constrained optimization are explo...
A rich collection of analytical tools based on differential geometric methods has been developed for...
In this book several streams of nonlinear control theory are merged and di- rected towards a constru...
A rich collection of analytical tools based on differential geometric methods has been developed for...
This paper will explore the use and construction of Gröbner bases through Buchberger\u27s algorithm....
Symbolic computation, also known as computer algebra, is a powerful tool in solving tough and intric...
A self-contained introduction to algebraic control for nonlinear systems suitable for researchers an...
Symbolic computation, also known as computer algebra, is a powerful tool in solving tough and intric...
The frequency-domain theory of linear systems, including the root locus is generalised to nonlinear ...
The theory of linear systems has been developed over many years into a unified collection of results...
AbstractSystems of nonlinear algebraic equations (SNAE) are ubiquitous in the many applications requ...
International audienceIn this paper, we show how stabilizing controllers for 2D systems can effectiv...