Add to ORKGFor two semesters, a fellow math major and I thoroughly proved results from Sections 1.1 – 1.8 of An Introduction to Chaotic Dynamical Systems by Robert Devaney. After going through Devaney's calculations and proofs, I created a multi-parameter family of functions to consider and observe. This is a piecewise function of polynomials that always intersects the x-axis at 0 and 1. It has two maxima and one minimum value. Depending on the range of the parameters, the minimum value can be above or below the x-axis. I have analyzed its behavior and determined the fixed and periodic points. I found that at certain parameter values the family of function's corresponding invariant set will be closed and totally disconnected. I conjecture that the inv...
Both fractal geometry and dynamical systems have a long history of development and have provided fer...
Chaotic systems with hidden attractors, infinite number of equilibrium points and different closed c...
• Non-linear systems of (ordinary) differential equations and their chaotic behav-ior in Hamiltonian...
The first‐order difference equation xn+ 1 = f(xn ), n = 0,1,…, wh...
Abstract: The chaotic behavior in the real dynamics of a one parameter family of nonlinear functions...
Treballs Finals de Grau de Matemàtiques, Facultat de Matemàtiques, Universitat de Barcelona, Any: 20...
PREFACE FOREWORD The Stability of One-Dimensional Maps Introduction Maps vs. Difference Equa...
Dynamical systems, even simple ones, can be unpredictable. These unpredictable dynamical systems are...
Regularity and Complexity in Dynamical Systems describes periodic and chaotic behaviors in dynamical...
The characterization and properties of Julia sets of one parame-ter family of transcendental meromor...
The book is concerned with the concepts of chaos and fractals, which are within the scopes of dynami...
In this work, we look at the dynamics of four different spaces, the interval, the unit circle, subsh...
ABSTRACT: Chaos Theory and Dynamical Systems has been considered as one of the most significant brea...
Article published in Mathematics Exchange, 8(1), 2011.Motivated by the fact that cubic maps have fou...
Limit cycles or, more general, periodic solutions of nonlinear dynamical systems occur in many diffe...
Both fractal geometry and dynamical systems have a long history of development and have provided fer...
Chaotic systems with hidden attractors, infinite number of equilibrium points and different closed c...
• Non-linear systems of (ordinary) differential equations and their chaotic behav-ior in Hamiltonian...
The first‐order difference equation xn+ 1 = f(xn ), n = 0,1,…, wh...
Abstract: The chaotic behavior in the real dynamics of a one parameter family of nonlinear functions...
Treballs Finals de Grau de Matemàtiques, Facultat de Matemàtiques, Universitat de Barcelona, Any: 20...
PREFACE FOREWORD The Stability of One-Dimensional Maps Introduction Maps vs. Difference Equa...
Dynamical systems, even simple ones, can be unpredictable. These unpredictable dynamical systems are...
Regularity and Complexity in Dynamical Systems describes periodic and chaotic behaviors in dynamical...
The characterization and properties of Julia sets of one parame-ter family of transcendental meromor...
The book is concerned with the concepts of chaos and fractals, which are within the scopes of dynami...
In this work, we look at the dynamics of four different spaces, the interval, the unit circle, subsh...
ABSTRACT: Chaos Theory and Dynamical Systems has been considered as one of the most significant brea...
Article published in Mathematics Exchange, 8(1), 2011.Motivated by the fact that cubic maps have fou...
Limit cycles or, more general, periodic solutions of nonlinear dynamical systems occur in many diffe...
Both fractal geometry and dynamical systems have a long history of development and have provided fer...
Chaotic systems with hidden attractors, infinite number of equilibrium points and different closed c...
• Non-linear systems of (ordinary) differential equations and their chaotic behav-ior in Hamiltonian...