Add to ORKGThis paper is based on the readings in the author’s independent study on ”advanced dynamical systems”, and the author’s mathematics honors project. It is a combination of the survey of some classical papers and the results from the research project. In the review part, none of the results are new and even less of them are due to the author; in the research part, we mainly focus the dynamics of the quadratic family along the real line. More specifically, in this paper we review and summarize the dynamics of one- and two- dimensional real quadratic maps from both topological and statistical viewpoints, and provide global pictures for their dynamics. Meanwhile, we briefly review the main results of the dynamics of one-dimensional complex quadr...
Abstract. We give a complete description for the dynamics of quadratic rational maps with coeffi-cie...
We study families of quadratic maps in an attempt to understand the role of dependence on parameters...
In addition to some new fundamental results about the dynam-ics of general 2-D quadratic maps, this ...
Honors Project Paper, Department of Mathematics and Statistics, University of Minnesota Duluth, July...
In: International Conference on Computational and Mathematical Methods on Science and Engineering, (...
This text is written for the students in the Master program at the University of Paris 6. Only a kno...
Abstract. We describe the (real) dynamics of a family of birational mappings of the plane. By combin...
In this note, the dynamics of a familv of quadratic maps in C^2 is investigated. Especially, the top...
Discrete models of density-dependent population growth provide simpleexamples of dynamical systems w...
We study families of quadratic maps in an attempt to understand the role of dependence on parameter...
New results about the existence of chaotic dynamics in the quadratic 3D systems are derived. These r...
In this paper, the dynamics of the Chebyshev-Halley family is studied on quadratic polynomials. A si...
We numerically study a network of two identical populations of identical real-valued quadratic maps....
In this paper, the dynamics of the Chebyshev–Halley family is studied on quadratic polynomials. A si...
an exposition of joint work with Janina Kotus. The tangent family $f_{\lambda}(z)=\lambda\tan(z) $ i...
Abstract. We give a complete description for the dynamics of quadratic rational maps with coeffi-cie...
We study families of quadratic maps in an attempt to understand the role of dependence on parameters...
In addition to some new fundamental results about the dynam-ics of general 2-D quadratic maps, this ...
Honors Project Paper, Department of Mathematics and Statistics, University of Minnesota Duluth, July...
In: International Conference on Computational and Mathematical Methods on Science and Engineering, (...
This text is written for the students in the Master program at the University of Paris 6. Only a kno...
Abstract. We describe the (real) dynamics of a family of birational mappings of the plane. By combin...
In this note, the dynamics of a familv of quadratic maps in C^2 is investigated. Especially, the top...
Discrete models of density-dependent population growth provide simpleexamples of dynamical systems w...
We study families of quadratic maps in an attempt to understand the role of dependence on parameter...
New results about the existence of chaotic dynamics in the quadratic 3D systems are derived. These r...
In this paper, the dynamics of the Chebyshev-Halley family is studied on quadratic polynomials. A si...
We numerically study a network of two identical populations of identical real-valued quadratic maps....
In this paper, the dynamics of the Chebyshev–Halley family is studied on quadratic polynomials. A si...
an exposition of joint work with Janina Kotus. The tangent family $f_{\lambda}(z)=\lambda\tan(z) $ i...
Abstract. We give a complete description for the dynamics of quadratic rational maps with coeffi-cie...
We study families of quadratic maps in an attempt to understand the role of dependence on parameters...
In addition to some new fundamental results about the dynam-ics of general 2-D quadratic maps, this ...