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OrbitSim

Interactive Newtonian N-body gravity simulator accelerated with C library.

Image

Online demo:

Link: https://alvinng4.github.io/orbit_simulator_Web/

Click once after you see the green loading bar showing "Ready to start!". You should then see the main menu. From there, simply select a system to start. See controls for basic controls.

This online demo is built with the pygbag package.

Warning

In Safari, if you accidently selected/clicked the window, the FPS would drops significantly. To fix it, simply click on something else outside the game window.

Gravity Simulator

Check out my other gravity simulator, with higher accuracy and ability to create 3D animated plots: https://github.com/alvinng4/Gravity-Simulator

Image

Documentation

Quick Start

Python version

This program requires Python version 3.10 or higher.

Installation

Download the source files, or clone this repository by running the following command in terminal:

git clone https://github.com/alvinng4/OrbitSim

Install the required packages by

pip install .

Running the program

Once you have downloaded the source files, navigate to the source directory in terminal and run

python orbit_sim [-n|--numpy] [-r|--resolution <width> <height>]

C library / Numpy (Optional)

By default, the simulation is performed in C to improve performance. If you want to use numpy, run the program with

python orbit_sim [-n|--numpy]

Changing the resolution (Optional)

The default resolution is set to the user's screen size. However, you can set your own resolution by the following command:

python3 orbit_sim [-r|--resolution <width> <height>]

Available systems

System Description
Void Emptiness
figure-8 A "figure-8" orbit involving three stars
pyth-3-body Three stars arranged in a triangle with length ratios of 3, 4, and 5
solar_system Solar System with the Sun and the planets

Tip

Pythagorean three body orbit is a highly chaotic orbit with close encounters, which is useful to test the difference between fixed and variable step size integrators. For RK4, the largest dt to produce desired result is 2e-8 days.

Controls

Action Control
Move camera W A S D/
Menu Esc
Pause P
Toggle full-screen mode F
Hide user interface H
Reset parameters R
Create new star Hold the right mouse button to create a star + drag the mouse to give it an initial boost.
Adjust parameter values Left-click the parameter on the parameters panel + scroll to change its value.
Switch integrators Left-click the integrator on the integrators panel.

Warning

Switching integrators or changing dt in the middle of simulation may produce some numerical error.

Available integrators

Fixed step size methods

Fixed step size integrators are simple methods to simulate the system with the given step size dt.

Fixed step size methods
Euler
Euler Cromer
Fourth Order Runge-Kutta (RK4)
Leapfrog

Embedded Runge-Kutta methods

Embedded RK methods are adaptive methods that decides the step size automatically based on the estimated error. The system would adopt smaller step size for smaller tolerance.

Embdedded Runge-Kutta methods Recommended tolerance*
Runge–Kutta–Fehlberg 4(5) 1e-8 to 1e-14
Dormand–Prince method (DOPRI) 5(4) 1e-8 to 1e-14
Verner's method (DVERK) 6(5) 1e-8 to 1e-14
Runge–Kutta–Fehlberg 7(8) 1e-4 to 1e-8

IAS15

IAS15 (Implicit integrator with Adaptive time Stepping, 15th order) [1] is a highly optimized and efficient integrator.

Recommended tolerance*: 1e-9

*For reference only

Feedback and Bugs

If you find any bugs or want to leave some feedback, please feel free to let me know by sending an email to [email protected] or open an issue.

Data Sources

The solar system positions and velocities data at 1/Jan/2024 are collected from the Horizons System [1]. Gravitational constant, and masses of the solar system objects are calculated using the data from R.S. Park et. al. [2].

References

  1. H. Rein, and D. S. Spiegel, 2014, "IAS15: A fast, adaptive, high-order integrator for gravitational dynamics, accurate to machine precision over a billion orbits", Monthly Notices of the Royal Astronomical Society 446: 1424–1437.
  2. Horizons System, Jet Propulsion Laboratory, https://ssd.jpl.nasa.gov/horizons/
  3. R. S. Park, et al., 2021, “The JPL Planetary and Lunar Ephemerides DE440 and DE441”, https://ssd.jpl.nasa.gov/doc/Park.2021.AJ.DE440.pdf, Astronomical Journal, 161:105.

Acknowledgement

The integrators in this project were developed with great assistance from the following book:

  • J. Roa, et al. Moving Planets Around: An Introduction to N-Body Simulations Applied to Exoplanetary Systems, MIT Press, 2020