ANALYSIS OF PERIODIC SOLUTION ON NONLINEAR OSCILLATOR SYSTEMS
Oscillator is a tool that is widely applied in everyday life because of its ability to produce oscillatory motion without the need for continuous external force. To obtain the desired oscillatory motion, it is necessary to analyze the bifurcation external force parameters of the oscillator system...
Saved in:
| Main Author: | |
|---|---|
| Format: | Final Project |
| Language: | Indonesia |
| Online Access: | https://digilib.itb.ac.id/gdl/view/55009 |
| Tags: |
Add Tag
No Tags, Be the first to tag this record!
|
| Institution: | Institut Teknologi Bandung |
| Language: | Indonesia |
| id |
id-itb.:55009 |
|---|---|
| spelling |
id-itb.:550092021-06-11T18:56:43ZANALYSIS OF PERIODIC SOLUTION ON NONLINEAR OSCILLATOR SYSTEMS Mubarok, Nahrul Indonesia Final Project nonlinear oscillator, scaling method, Floquet Theorem, numerical continuation, bifurcation diagram. INSTITUT TEKNOLOGI BANDUNG https://digilib.itb.ac.id/gdl/view/55009 Oscillator is a tool that is widely applied in everyday life because of its ability to produce oscillatory motion without the need for continuous external force. To obtain the desired oscillatory motion, it is necessary to analyze the bifurcation external force parameters of the oscillator system. The resulting oscillatory motion can be viewed as an isolated periodic solution of the system of differential equations, which is modeled by oscillator system. In this final project, we will look for a method to find the periodic solution of an oscillator equation. This method finds the periodic solution with a nonlinear external force that depends on the speed of the oscillator load. Numerical integration can be used to find periodic solutions by integrating until the amplitude of the solution does not change significantly. The periodic solution can also be found by using the root-finding method of the scaled oscillator equation. This method is suitable for finding the period of the periodic solution of the oscillator equation if the period does not appear explicitly in the equation. The linear stability of the periodic solution can be found using Floquet’s Theorem. The numerical continuation method can be used to replace iterations on the bifurcation parameters. This method is effective when the drawn orbit has an inflection point. By using these methods to draw a bifurcation diagram, the behavior of the oscillator system under review can be categorized into three parts with respect to changes in the linear damping parameters. 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 |
Oscillator is a tool that is widely applied in everyday life because of its ability
to produce oscillatory motion without the need for continuous external force.
To obtain the desired oscillatory motion, it is necessary to analyze the bifurcation
external force parameters of the oscillator system. The resulting oscillatory
motion can be viewed as an isolated periodic solution of the system of differential
equations, which is modeled by oscillator system. In this final project, we will look
for a method to find the periodic solution of an oscillator equation. This method
finds the periodic solution with a nonlinear external force that depends on the speed
of the oscillator load. Numerical integration can be used to find periodic solutions
by integrating until the amplitude of the solution does not change significantly. The
periodic solution can also be found by using the root-finding method of the scaled
oscillator equation. This method is suitable for finding the period of the periodic
solution of the oscillator equation if the period does not appear explicitly in the
equation. The linear stability of the periodic solution can be found using Floquet’s
Theorem. The numerical continuation method can be used to replace iterations on
the bifurcation parameters. This method is effective when the drawn orbit has an
inflection point. By using these methods to draw a bifurcation diagram, the behavior
of the oscillator system under review can be categorized into three parts with respect
to changes in the linear damping parameters. |
| format |
Final Project |
| author |
Mubarok, Nahrul |
| spellingShingle |
Mubarok, Nahrul ANALYSIS OF PERIODIC SOLUTION ON NONLINEAR OSCILLATOR SYSTEMS |
| author_facet |
Mubarok, Nahrul |
| author_sort |
Mubarok, Nahrul |
| title |
ANALYSIS OF PERIODIC SOLUTION ON NONLINEAR OSCILLATOR SYSTEMS |
| title_short |
ANALYSIS OF PERIODIC SOLUTION ON NONLINEAR OSCILLATOR SYSTEMS |
| title_full |
ANALYSIS OF PERIODIC SOLUTION ON NONLINEAR OSCILLATOR SYSTEMS |
| title_fullStr |
ANALYSIS OF PERIODIC SOLUTION ON NONLINEAR OSCILLATOR SYSTEMS |
| title_full_unstemmed |
ANALYSIS OF PERIODIC SOLUTION ON NONLINEAR OSCILLATOR SYSTEMS |
| title_sort |
analysis of periodic solution on nonlinear oscillator systems |
| url |
https://digilib.itb.ac.id/gdl/view/55009 |
| _version_ |
1822274122274570240 |