AbstractThis paper first analyzes the features of two classes of numerical methods for global analysis of nonlinear dynamical systems, which regard state space respectively as continuous and discrete ones. On basis of this understanding it then points out that the previously proposed method of point mapping under cell reference (PMUCR), has laid a frame work for the development of a two scaled numerical method suitable for the global analysis of high dimensional nonlinear systems, which may take the advantages of both classes of single scaled methods but will release the difficulties induced by the disadvantages of them. The basic ideas and main steps of implementation of the two scaled method, namely extended PMUCR, are elaborated. Finally...
A nonlinear system of equations is said to be reducible if it can be divided into m blocks (m>1) in ...
This dissertation introduces novel methods for solving highly challenging model- ing and control pro...
In this paper, we study nonmonotone globalization strategies, in connection with the finite-differen...
AbstractThis paper first analyzes the features of two classes of numerical methods for global analys...
Chaotic itinerancy is a complex phenomenon in high-dimensional dynamic systems, by which an orbit su...
W.F.W. nr. 92.113 In this report, an introduction is given on the method of cell mapping, a tool for...
In this paper we will be concerned with numerical methods for the solution of nonlinear systems of t...
The Cell Mapping method is a robust tool for investigating nonlinear dynamic systems. It is capable ...
The work is devoted to the novel global analysis of the strongly nonlinear dynamical systems (NDS) b...
Recently proposed algorithms for nonlinear dimensionality reduction fall broadly into two categorie...
We present a numerical method to prove certain statements about the global dynamics of infinite dime...
We consider the solution of several nonlinear systems that come from the discretization of two-dimen...
We consider reduction of dimension for nonlinear dynamical systems. We demonstrate that in some case...
A globally convergent discrete Newton method is proposed for solving large-scale nonlinear systems o...
The analysis of parameterised nonlinear models is considered and a new approach is introduced which ...
A nonlinear system of equations is said to be reducible if it can be divided into m blocks (m>1) in ...
This dissertation introduces novel methods for solving highly challenging model- ing and control pro...
In this paper, we study nonmonotone globalization strategies, in connection with the finite-differen...
AbstractThis paper first analyzes the features of two classes of numerical methods for global analys...
Chaotic itinerancy is a complex phenomenon in high-dimensional dynamic systems, by which an orbit su...
W.F.W. nr. 92.113 In this report, an introduction is given on the method of cell mapping, a tool for...
In this paper we will be concerned with numerical methods for the solution of nonlinear systems of t...
The Cell Mapping method is a robust tool for investigating nonlinear dynamic systems. It is capable ...
The work is devoted to the novel global analysis of the strongly nonlinear dynamical systems (NDS) b...
Recently proposed algorithms for nonlinear dimensionality reduction fall broadly into two categorie...
We present a numerical method to prove certain statements about the global dynamics of infinite dime...
We consider the solution of several nonlinear systems that come from the discretization of two-dimen...
We consider reduction of dimension for nonlinear dynamical systems. We demonstrate that in some case...
A globally convergent discrete Newton method is proposed for solving large-scale nonlinear systems o...
The analysis of parameterised nonlinear models is considered and a new approach is introduced which ...
A nonlinear system of equations is said to be reducible if it can be divided into m blocks (m>1) in ...
This dissertation introduces novel methods for solving highly challenging model- ing and control pro...
In this paper, we study nonmonotone globalization strategies, in connection with the finite-differen...