Add to ORKGExact analytical solutions to periodic motions in nonlinear dynamical systems are almost not possible. Since the 18th century, one has extensively used techniques such as perturbation methods to obtain approximate analytical solutions of periodic motions in nonlinear systems. However, the perturbation methods cannot provide the enough accuracy of analytical solutions of periodic motions in nonlinear dynamical systems. So the bifurcation trees of periodic motions to chaos cannot be achieved analytically. The author has developed an analytical technique that is more effective to achieve perio
In this paper, two different methods to compute the period-doubling route to chaos (or Feigenbaum ch...
The main features and components of a new so-called bifurcation theory of nonlinear dynamics and cha...
(Communicated by Àngel Jorba) Abstract. The standard Melnikov method for analyzing the onset of cha...
THE MAIN GOAL OF THIS THESIS IS TO DEVELOP AND USE ANALYTICAL AS WELL AS NUMERICAL METHODS STUDYI...
THE MAIN GOAL OF THIS THESIS IS TO DEVELOP AND USE ANALYTICAL AS WELL AS NUMERICAL METHODS STUDYI...
THE MAIN GOAL OF THIS THESIS IS TO DEVELOP AND USE ANALYTICAL AS WELL AS NUMERICAL METHODS STUDYI...
Limit cycles or, more general, periodic solutions of nonlinear dynamical systems occur in many diffe...
The behavior of systems such as periodicity, fixed points, and most importantly chaos has evolved as...
A periodically forced mathematical pendulum is one of the typical and popular nonlinear oscillators ...
The article is devoted to the parametrical analysis of periodic and chaotic oscillations in the nonl...
The article is devoted to the parametrical analysis of periodic and chaotic oscillations in the nonl...
Nonlinear dynamics with applications. Intuitive approach with emphasis on geometric thinking, comput...
This unique book presents the discretization of continuous systems and implicit mapping dynamics of ...
Chaos is an active research subject in the fields of science in recent years. It is a complex and an...
This book for the first time examines periodic motions to chaos in time-delay systems, which exist e...
In this paper, two different methods to compute the period-doubling route to chaos (or Feigenbaum ch...
The main features and components of a new so-called bifurcation theory of nonlinear dynamics and cha...
(Communicated by Àngel Jorba) Abstract. The standard Melnikov method for analyzing the onset of cha...
THE MAIN GOAL OF THIS THESIS IS TO DEVELOP AND USE ANALYTICAL AS WELL AS NUMERICAL METHODS STUDYI...
THE MAIN GOAL OF THIS THESIS IS TO DEVELOP AND USE ANALYTICAL AS WELL AS NUMERICAL METHODS STUDYI...
THE MAIN GOAL OF THIS THESIS IS TO DEVELOP AND USE ANALYTICAL AS WELL AS NUMERICAL METHODS STUDYI...
Limit cycles or, more general, periodic solutions of nonlinear dynamical systems occur in many diffe...
The behavior of systems such as periodicity, fixed points, and most importantly chaos has evolved as...
A periodically forced mathematical pendulum is one of the typical and popular nonlinear oscillators ...
The article is devoted to the parametrical analysis of periodic and chaotic oscillations in the nonl...
The article is devoted to the parametrical analysis of periodic and chaotic oscillations in the nonl...
Nonlinear dynamics with applications. Intuitive approach with emphasis on geometric thinking, comput...
This unique book presents the discretization of continuous systems and implicit mapping dynamics of ...
Chaos is an active research subject in the fields of science in recent years. It is a complex and an...
This book for the first time examines periodic motions to chaos in time-delay systems, which exist e...
In this paper, two different methods to compute the period-doubling route to chaos (or Feigenbaum ch...
The main features and components of a new so-called bifurcation theory of nonlinear dynamics and cha...
(Communicated by Àngel Jorba) Abstract. The standard Melnikov method for analyzing the onset of cha...