- teilchen is a simple physics library based on particles, forces, constraints and behaviors.
- teilchen is also a collection of a variety of concepts useful for modeling with virtual physics and behaviors. nothing new, nothing fancy, except maybe for the combination of forces ( external forces ) and behavior ( internal forces ).
- teilchen is also a processing.org-style library.
- teilchen is a german word and a synonym for Partikel which translates to the english particle.
the library is hosted on github teilchen.
there are a few different kinds of particles. the most simple particle has just a handful of properties like position, velocity, acceleration, mass, and radius. other particles have additional properties like a limited lifetime or individual behaviors.
forces act on particles ( or rather on their acceleration ). one of the most obvious forces is Gravity which pulls particles into a specific direction. but there are all kinds of other forces too like Attractor or TriangleDeflector. some forces affect all particles in a system, while others only act on specific particles. one prominent example of the latter is the Spring that tries to maintain a fixed distance between two particles.
a behavior is a special kind of force. it is an internal force moving the particle from within and it affects a single particle only. an common example of a behavior is a Motor which drives a particle into a specific direction. another example is the Seek behavior which constantly drives a particle towards a certain position.
constraints act on particle positions outside of a physical simulation. constraints manipulate the particles’ positions to satifsy specific constraints like for example keeping an equal distance between two particles or keeping particles within a volume. although constraints might seem similar to forces, it is important to know that forces can only accelerate particles while contraints directly teleport particles which as a rule of thumb is more effective but less realistic.
integrators are used to integrate acceleration and velocity to calculate the new position. the most well-known is the euler integrator, but there are also optimized versions like runge-kutta or midpoint or even slightly different concepts like verlet. integrators can affect the precision and stability of a particle simulation.
generated reference of the library
although explaining vectors ( and linear algebra ) is beyond the scope of this library, it can be very helpful to understand the basics of vector operations. the following slides aim to explain a few basics:
a vector consists of a series of numbers ( one for each dimension ) that are the coordinates of the endpoint of that vector. therefore vectors are often used to describe positions and directions.
this example shows a 2-dimensional vector pointing to the x-coordinate 4 and the y-coordinate 3. the vector is written as: (4,3)
visually speaking a vector is like an arrow starting at the origin (0,0) and pointing to an endpoint ( e.g (4,3) ).
in programm code a vector can be represented as a class with two fields x + y:
class Vector2f {
float x = 0;
float y = 0;
}
Vector2f a = new Vector2f(4,3);
println("(" + a.x + "," + a.y + ")");
> (4,3)
vectors can be added by adding the components of one vector to the components of another one.
in this example the x-components 4 + 2 are added with the result of 6 and the y-components 3 + -1 are added resulting in 2.
(4,3) + (2,-1) = (6,2)
visually speaking vectors are added by putting the start of one vector at the end of another. the result is a vector running from the start of the first vector to the end of the second.
in programm code an addition of one vector to another vector can be represented like this:
class Vector2f {
float x = 0;
float y = 0;
void add(Vector2f v) {
x += v.x;
y += v.y;
}
}
Vector2f a = new Vector2f(4,3);
Vector2f b = new Vector2f(2,-1);
a.add(b);
println("(" + a.x + "," + a.y + ")");
> (6,2)
vectors can be subtracted by subtracting the components of one vector from the components of another vector.
in this example the x-components 4 is subtracted from 6 with the result of 2 and the y-component 3 is subtracted from 2 resulting in -1.
(6,2) - (4,3) = (2,-1)
visually speaking the result of a subtraction is a vector between the tips of the two vectors. the resulting vector points to the tip of the first vector away from the second vector.
in programm code a subtraction of a vector from another vector can be represented like this:
class Vector2f {
float x = 0;
float y = 0;
void add(Vector2f v) {
x += v.x;
y += v.y;
}
void sub(Vector2f v) {
x -= v.x;
y -= v.y;
}
}
Vector2f a = new Vector2f(6,2);
Vector2f b = new Vector2f(4,3);
a.sub(b);
println("(" + a.x + "," + a.y + ")");
> (2,-1)
a vector can be scaled ( or multiplied ) by a value ( or scalar ).
in this example the vector (4,3) is scaled by a value of 2 resulting in the vector (8,6).
(4,3) * 2 = (8,6)
visually speaking scaling a vector changes the length of the vector.
in programm code scaling a vector can be represented like this:
class Vector2f {
float x = 0;
float y = 0;
void add(Vector2f v) {
x += v.x;
y += v.y;
}
void sub(Vector2f v) {
x -= v.x;
y -= v.y;
}
void mult(float s) {
x *= s;
y *= s;
}
}
Vector2f a = new Vector2f(4,3);
a.mult(2);
println("(" + a.x + "," + a.y + ")");
> (8,6)
the length ( or magnitude ) of a vector can be calculated by using the pythagorean theorem:
a * a + b * b = c * c
in this example the length 5 of the vector (4,3) is calculated where a = x, b = y, and c = length:
x * x + y * y = length * length
length * length = 4 * 4 + 3 * 3
length = √( 4 * 4 + 3 * 3 )
length = 5
in programm code calculating the length of a vector can be implemented like this:
class Vector2f {
float x = 0;
float y = 0;
void add(Vector2f v) {
x += v.x;
y += v.y;
}
void sub(Vector2f v) {
x -= v.x;
y -= v.y;
}
void mult(float s) {
x *= s;
y *= s;
}
float mag() {
return sqrt(x*x + y*y);
}
}
Vector2f a = new Vector2f(4,3);
float length = a.mag();
println(length);
> 5
normalizing a vector refers to setting its magnitude to a value of 1. this is achieved by dividing each component of a vector by the initial magnitude.
in this example the length of the vector (4,3) is 5:
(4/5,3/5) = (0.8,0.6)
in programm code normalizing a vector can be represented like this:
class Vector2f {
float x = 0;
float y = 0;
void add(Vector2f v) { … }
void sub(Vector2f v) { … }
void mult(float s) { … }
float mag() {
return sqrt(x*x + y*y);
}
void normalize() {
float d = mag();
x /= d;
y /= d;
}
}
Vector2f a = new Vector2f(4,3);
a.normalize();
println("(" + a.x + "," + a.y + ") " + a.mag());
> (0.8,0.6) 1.0
note, that this class is implementing just a very basic set of functions. a real life vector class ( i.e PVector from Processing.org ) has many, many more functions. in programm code a 2-dimensional vector class can be represented like this:
class Vector2f {
float x = 0;
float y = 0;
void add(Vector2f v) {
x += v.x;
y += v.y;
}
void sub(Vector2f v) {
x -= v.x;
y -= v.y;
}
void mult(float s) {
x *= s;
y *= s;
}
float mag() {
return sqrt(x*x + y*y);
}
void normalize() {
float d = mag();
x /= d;
y /= d;
}
}
a 3-dimensional vector is not that different from a 2-dimensional vector. in many operations it suffices to add a z-coordinate. in programm code it can be represented like this:
class Vector3f {
float x = 0;
float y = 0;
float z = 0;
void add(Vector3f v) {
x += v.x;
y += v.y;
z += z.y;
}
void sub(Vector3f v) {
x -= v.x;
y -= v.y;
z -= v.z;
}
void mult(float s) {
x *= s;
y *= s;
z *= s;
}
float mag() {
return sqrt(x*x + y*y + z*z);
}
void normalize() {
float d = mag();
x /= d;
y /= d;
z /= d;
}
}
note, that this class is implementing just a very basic set of functions. a real life vector class ( i.e PVector from Processing.org ) has many, many more functions.
J. Ström, K. Åström, and T. Akenine-Möller: immersive linear algebra sheds a much more mathematical light on the topic … but has animated illustrations and takes some time to introduces the official terminology.
a good starting point and a great resource for learning more about vectors, especially in combination with matrices, is The Matrix and Quaternions FAQ .