The results of extensive computations are presented in order to accurately characterize transitions to chaos for the Kuramoto-Sivashinsky equation. In particular, the oscillatory dynamics in a window that supports a complete sequence of period doubling bifurcations preceding chaos is followed. As many as thirteen period doublings are followed and used to compute the Feigenbaum number for the cascade and so enable, for the first time, an accurate numerical evaluation of the theory of universal behavior of nonlinear systems, for an infinite dimensional dynamical system. Furthermore, the dynamics at the threshold of chaos exhibit a fractal behavior which is demonstrated and used to compute a universal scaling factor that enables the self-simil...
This book is conceived as a comprehensive and detailed text-book on non-linear dynamical systems wit...
We consider situations where, in a continuous-time dynamical system, a nonchaotic attractor coexists...
Some of non-ideal dynamic systems are considered. It is discovered and described the complicated tra...
The results of extensive numerical experiments of the spatially periodic initial value problem for t...
We report the results of extensive numerical experiments on the Kuramoto-Sivashinsky equation in the...
Multifractal properties of a chaotic attractor are usefully quantified by its spectrum of singularit...
The Kuramoto-Sivashinsky equation in one spatial dimension (1D KSE) is one of the most well-known an...
In this paper, two different methods to compute the period-doubling route to chaos (or Feigenbaum ch...
We study the emergence of pattern formation and chaotic dynamics in the one-dimensional (1D) general...
AbstractWe study a dynamical system described by the Duffing equation under static plus large period...
We propose a general framework for proving that a compact, infinite-dimensional map has an invariant...
Practical methods, based upon linear systems theory, are explored for applications to nonlinear phen...
An in depth study of temporal chaotic systems, both discrete and continuous, is presented. The tech...
A two dimensional flow governed by the incompressible Navier-Stokes equations with a steady spatiall...
The Kuramoto-Sivashinsky equation was introduced as a simple 1-dimensional model of instabilities in...
This book is conceived as a comprehensive and detailed text-book on non-linear dynamical systems wit...
We consider situations where, in a continuous-time dynamical system, a nonchaotic attractor coexists...
Some of non-ideal dynamic systems are considered. It is discovered and described the complicated tra...
The results of extensive numerical experiments of the spatially periodic initial value problem for t...
We report the results of extensive numerical experiments on the Kuramoto-Sivashinsky equation in the...
Multifractal properties of a chaotic attractor are usefully quantified by its spectrum of singularit...
The Kuramoto-Sivashinsky equation in one spatial dimension (1D KSE) is one of the most well-known an...
In this paper, two different methods to compute the period-doubling route to chaos (or Feigenbaum ch...
We study the emergence of pattern formation and chaotic dynamics in the one-dimensional (1D) general...
AbstractWe study a dynamical system described by the Duffing equation under static plus large period...
We propose a general framework for proving that a compact, infinite-dimensional map has an invariant...
Practical methods, based upon linear systems theory, are explored for applications to nonlinear phen...
An in depth study of temporal chaotic systems, both discrete and continuous, is presented. The tech...
A two dimensional flow governed by the incompressible Navier-Stokes equations with a steady spatiall...
The Kuramoto-Sivashinsky equation was introduced as a simple 1-dimensional model of instabilities in...
This book is conceived as a comprehensive and detailed text-book on non-linear dynamical systems wit...
We consider situations where, in a continuous-time dynamical system, a nonchaotic attractor coexists...
Some of non-ideal dynamic systems are considered. It is discovered and described the complicated tra...