The correspondence between iterated integrals and a noncommutative algebra is used to recast the given dynamical system from the time domain to the Laplace-Borel transform domain. It is then shown that the following algebraic criterion has to be satisfied for the outset of chaos: the limit (as tau approaches infinity and x sub 0 approaches infinity) of ((sigma(k=0) (tau sup k) / (k* x sub 0 sup k)) G II G = 0, where G is the generating power series of the trajectories, the symbol II is the shuffle product (le melange) of the noncommutative algebra, x sub 0 is a noncommutative variable, and tau is the correlation parameter. In the given equation, symbolic forms for both G and II can be obtained by use of one of the currently available symbol...
This paper investigates the effectiveness of several criteria for validating models which exhibit ch...
abstract: In this thesis I introduce a new direction to computing using nonlinear chaotic dynamics. ...
This chapter deals with chaotic systems. Based on the characterization of deterministic chaos, unive...
Robust chaos is determined by the absence of periodic windows in bifurcationdiagrams and coexisting ...
AbstractGiven a nonlinear control system, one can view its output function as a signal, parametrized...
In this paper, two different methods to compute the period-doubling route to chaos (or Feigenbaum ch...
This book is conceived as a comprehensive and detailed text-book on non-linear dynamical systems wit...
The results of extensive computations are presented in order to accurately characterize transitions ...
Some of non-ideal dynamic systems are considered. It is discovered and described the complicated tra...
This book presents detailed descriptions of chaos for continuous-time systems. It is the first-ever ...
We introduce the basic concepts and methods to formalize and analyze deterministic chaos, with links...
Acknowledgements The author wishes to acknowledge G. Giacomelli, M. Mulansky, and L. Ricci for early...
The first‐order difference equation xn+ 1 = f(xn ), n = 0,1,…, where f: R → R, is referred as an one...
Non-symbolic computation (as, e.g., in biological and artificial neural networks) is astonishingly g...
We consider situations where, in a continuous-time dynamical system, a nonchaotic attractor coexists...
This paper investigates the effectiveness of several criteria for validating models which exhibit ch...
abstract: In this thesis I introduce a new direction to computing using nonlinear chaotic dynamics. ...
This chapter deals with chaotic systems. Based on the characterization of deterministic chaos, unive...
Robust chaos is determined by the absence of periodic windows in bifurcationdiagrams and coexisting ...
AbstractGiven a nonlinear control system, one can view its output function as a signal, parametrized...
In this paper, two different methods to compute the period-doubling route to chaos (or Feigenbaum ch...
This book is conceived as a comprehensive and detailed text-book on non-linear dynamical systems wit...
The results of extensive computations are presented in order to accurately characterize transitions ...
Some of non-ideal dynamic systems are considered. It is discovered and described the complicated tra...
This book presents detailed descriptions of chaos for continuous-time systems. It is the first-ever ...
We introduce the basic concepts and methods to formalize and analyze deterministic chaos, with links...
Acknowledgements The author wishes to acknowledge G. Giacomelli, M. Mulansky, and L. Ricci for early...
The first‐order difference equation xn+ 1 = f(xn ), n = 0,1,…, where f: R → R, is referred as an one...
Non-symbolic computation (as, e.g., in biological and artificial neural networks) is astonishingly g...
We consider situations where, in a continuous-time dynamical system, a nonchaotic attractor coexists...
This paper investigates the effectiveness of several criteria for validating models which exhibit ch...
abstract: In this thesis I introduce a new direction to computing using nonlinear chaotic dynamics. ...
This chapter deals with chaotic systems. Based on the characterization of deterministic chaos, unive...