In this work we describe how to prove with computer assistance the existence of fixed points and periodic orbits for infinite dimensional discrete dynamical systems. The method is based on Krawczyk operator. As an example we prove the existence of three fixed points, one period–2 and one period–4 orbit for the Kot-Schaffer growth-dispersal model. 1
In this paper, local dynamics, bifurcations and chaos control in a discrete-time predator-prey model...
Não disponívelThis work is devoted to the study of Dynamical Systems defined by Autonomous Retarded ...
This paper concerns bifurcation for n dimensional T-periodic one parameter differential systems. Exi...
We present a numerical method to prove certain statements about the global dynamics of infinite dime...
Bakalaura darbā apskatīti diskrētu dinamisku sistēmu pamatjēdzieni, akcentējot periodisko punktu eks...
This thesis is made up of two parts, which are connected by a common subject, Discrete Dynamical Sys...
We present a systematic methodology to determine and locate analytically isolated periodic points of...
We present some results on the existence and the minimum period of periodic orbits for discrete-time...
We investigate the convergence towards periodic orbits in discrete dynamical systems. We examine the...
We investigate the convergence towards periodic orbits in discrete dynamical systems. We examine the...
This master thesis deals with periodic points of transcendental Hénon maps, a subject in complex dyn...
The problem about co-existence of the periodical, almost periodical and recurrent orbits of the one-...
Abstract. We present here results about the existence of periodic orbits for projected dynamical sys...
We study the discrete one dimensional dynamical systems given by continuous functions mapping a clos...
We present some results on existence, minimum period, number of periodic orbits, and stability ...
In this paper, local dynamics, bifurcations and chaos control in a discrete-time predator-prey model...
Não disponívelThis work is devoted to the study of Dynamical Systems defined by Autonomous Retarded ...
This paper concerns bifurcation for n dimensional T-periodic one parameter differential systems. Exi...
We present a numerical method to prove certain statements about the global dynamics of infinite dime...
Bakalaura darbā apskatīti diskrētu dinamisku sistēmu pamatjēdzieni, akcentējot periodisko punktu eks...
This thesis is made up of two parts, which are connected by a common subject, Discrete Dynamical Sys...
We present a systematic methodology to determine and locate analytically isolated periodic points of...
We present some results on the existence and the minimum period of periodic orbits for discrete-time...
We investigate the convergence towards periodic orbits in discrete dynamical systems. We examine the...
We investigate the convergence towards periodic orbits in discrete dynamical systems. We examine the...
This master thesis deals with periodic points of transcendental Hénon maps, a subject in complex dyn...
The problem about co-existence of the periodical, almost periodical and recurrent orbits of the one-...
Abstract. We present here results about the existence of periodic orbits for projected dynamical sys...
We study the discrete one dimensional dynamical systems given by continuous functions mapping a clos...
We present some results on existence, minimum period, number of periodic orbits, and stability ...
In this paper, local dynamics, bifurcations and chaos control in a discrete-time predator-prey model...
Não disponívelThis work is devoted to the study of Dynamical Systems defined by Autonomous Retarded ...
This paper concerns bifurcation for n dimensional T-periodic one parameter differential systems. Exi...