CHAOTIC DYNAMICS AND BIFURCATION ANALYSIS OF NE12 SYSTEM

CHAOTIC DYNAMICS AND BIFURCATION ANALYSIS OF NE12 SYSTEM

Using custom software, Julien Clinton Sprott with Sajad Jafari and M. R. H. Golpayegani, found 17 new systems of nonlinear ordinary differential equations, that published at 2013, shown to have chaotic dynamics with the simplest form, in the sense algebraic simplicity (nonlinear function in the f...

Full description

Saved in:
Bibliographic Details
Main Author: Ismail Yunus, Muhammad
Format: Theses
Language:Indonesia
Online Access:https://digilib.itb.ac.id/gdl/view/59557
Tags: Add Tag
No Tags, Be the first to tag this record!
Institution: Institut Teknologi Bandung
Language: Indonesia
id id-itb.:59557
spelling id-itb.:595572021-09-10T14:00:46ZCHAOTIC DYNAMICS AND BIFURCATION ANALYSIS OF NE12 SYSTEM Ismail Yunus, Muhammad Indonesia Theses Cascade of Period-Doubling, Chaotic Dynamics, Fold Bifurcation Homoclinic Orbits, Hopf Supercritical Bifurcation, NE Systems. INSTITUT TEKNOLOGI BANDUNG https://digilib.itb.ac.id/gdl/view/59557 Using custom software, Julien Clinton Sprott with Sajad Jafari and M. R. H. Golpayegani, found 17 new systems of nonlinear ordinary differential equations, that published at 2013, shown to have chaotic dynamics with the simplest form, in the sense algebraic simplicity (nonlinear function in the form of quadratic polynomials), and also not having any equilibrium points for a specific value of parameter. In this thesis, one of the system named NE12 will be studied to found out how the system behave and how chaotic solution surfaced. Using analytical and numerical tool, it will be shown that NE12 will have fold and Hopf supercritical bifurcations. In NE12 case, its periodic solutions will shown to have cascade of period-doubling bifurcation. Another result that will be numerically shown in this thesis is the creation of homoclinic orbits that later will be destroyed by varying the parameter. Chaotic dynamics of the system will be quantify by using limit-set diagram, Lyapunov exponent, and also Kaplan-Yorke dimension of the system. text
institution Institut Teknologi Bandung
building Institut Teknologi Bandung Library
continent Asia
country Indonesia
Indonesia
content_provider Institut Teknologi Bandung
collection Digital ITB
language Indonesia
description Using custom software, Julien Clinton Sprott with Sajad Jafari and M. R. H. Golpayegani, found 17 new systems of nonlinear ordinary differential equations, that published at 2013, shown to have chaotic dynamics with the simplest form, in the sense algebraic simplicity (nonlinear function in the form of quadratic polynomials), and also not having any equilibrium points for a specific value of parameter. In this thesis, one of the system named NE12 will be studied to found out how the system behave and how chaotic solution surfaced. Using analytical and numerical tool, it will be shown that NE12 will have fold and Hopf supercritical bifurcations. In NE12 case, its periodic solutions will shown to have cascade of period-doubling bifurcation. Another result that will be numerically shown in this thesis is the creation of homoclinic orbits that later will be destroyed by varying the parameter. Chaotic dynamics of the system will be quantify by using limit-set diagram, Lyapunov exponent, and also Kaplan-Yorke dimension of the system.
format Theses
author Ismail Yunus, Muhammad
spellingShingle Ismail Yunus, Muhammad
CHAOTIC DYNAMICS AND BIFURCATION ANALYSIS OF NE12 SYSTEM
author_facet Ismail Yunus, Muhammad
author_sort Ismail Yunus, Muhammad
title CHAOTIC DYNAMICS AND BIFURCATION ANALYSIS OF NE12 SYSTEM
title_short CHAOTIC DYNAMICS AND BIFURCATION ANALYSIS OF NE12 SYSTEM
title_full CHAOTIC DYNAMICS AND BIFURCATION ANALYSIS OF NE12 SYSTEM
title_fullStr CHAOTIC DYNAMICS AND BIFURCATION ANALYSIS OF NE12 SYSTEM
title_full_unstemmed CHAOTIC DYNAMICS AND BIFURCATION ANALYSIS OF NE12 SYSTEM
title_sort chaotic dynamics and bifurcation analysis of ne12 system
url https://digilib.itb.ac.id/gdl/view/59557
_version_ 1822003277533806592

Similar Items