Add to ORKGIn this paper we apply a suitable and efficient numerical technique to obtain the periodic solutions arising in period doubling scenario of one dimensional discrete dynamical system. Applying this technique we obtain bifurcation points upto period  with good accuracy which is a satisfactory result to predict accumulation point and which is verified by Lyapunov exponent
AbstractFor the study of period doubling bifurcations in nonlinear T-periodic forced oscillators dep...
This paper concerns bifurcation for n dimensional T-periodic one parameter differential systems. Exi...
This paper concerns bifurcation for n dimensional T-periodic one parameter differential systems. Exi...
Limit cycles or, more general, periodic solutions of nonlinear dynamical systems occur in many diffe...
There is a growing interest in the study of periodic phenomena in largescale nonlinear dynamical sys...
This book focuses on bifurcation and stability in nonlinear discrete systems, including monotonic an...
This letter describes a new computational method to obtain the bifurcation parameter value of a limi...
A lot of works are dedicated to studying different mathematical models of competition with goal of d...
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...
AbstractSystems of autonomous first-order ordinary differential equations are considered (dimension ...
THE MAIN GOAL OF THIS THESIS IS TO DEVELOP AND USE ANALYTICAL AS WELL AS NUMERICAL METHODS STUDYI...
This unique book presents the discretization of continuous systems and implicit mapping dynamics of ...
In this paper, two different methods to compute the period-doubling route to chaos (or Feigenbaum ch...
Discrete dynamical system is a system that evolve dynamically with discrete time. In this paper, we ...
AbstractFor the study of period doubling bifurcations in nonlinear T-periodic forced oscillators dep...
This paper concerns bifurcation for n dimensional T-periodic one parameter differential systems. Exi...
This paper concerns bifurcation for n dimensional T-periodic one parameter differential systems. Exi...
Limit cycles or, more general, periodic solutions of nonlinear dynamical systems occur in many diffe...
There is a growing interest in the study of periodic phenomena in largescale nonlinear dynamical sys...
This book focuses on bifurcation and stability in nonlinear discrete systems, including monotonic an...
This letter describes a new computational method to obtain the bifurcation parameter value of a limi...
A lot of works are dedicated to studying different mathematical models of competition with goal of d...
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...
AbstractSystems of autonomous first-order ordinary differential equations are considered (dimension ...
THE MAIN GOAL OF THIS THESIS IS TO DEVELOP AND USE ANALYTICAL AS WELL AS NUMERICAL METHODS STUDYI...
This unique book presents the discretization of continuous systems and implicit mapping dynamics of ...
In this paper, two different methods to compute the period-doubling route to chaos (or Feigenbaum ch...
Discrete dynamical system is a system that evolve dynamically with discrete time. In this paper, we ...
AbstractFor the study of period doubling bifurcations in nonlinear T-periodic forced oscillators dep...
This paper concerns bifurcation for n dimensional T-periodic one parameter differential systems. Exi...
This paper concerns bifurcation for n dimensional T-periodic one parameter differential systems. Exi...