# Jelly physics 3d

I want to ask about jelly physics ( http://www.youtube.com/watch?v=I74rJFB_W1k ), where I can find some good place to start making things like that ? I want to make simulation of cars crash and I want use this jelly physics, but I can't find a lot about them. I don't want use existing physics engine, I want write my own :)

Something like what you see in the video you linked to could be accomplished with a mass-spring system. However, as you vary the number of masses and springs, keeping your spring constants the same, you will get wildly varying results. In short, mass-spring systems are not good approximations of a continuum of matter.

Typically, these sorts of animations are created using what is called the Finite Element Method (FEM). The FEM does converge to a continuum, which is nice. And although it does require a bit more know-how than a mass-spring system, it really isn't too bad. The basic idea, derived from the study of continuum mechanics, can be put this way:

1. Break the volume of your object up into many small pieces (elements), usually tetrahedra. Let's call the entire collection of these elements the mesh. You'll actually want to make two copies of this mesh. Label one the "rest" mesh, and the other the "world" mesh. I'll tell you why next.

2. For each tetrahedron in your world mesh, measure how deformed it is relative to its corresponding rest tetrahedron. The measure of how deformed it is is called "strain". This is typically accomplished by first measuring what is known as the deformation gradient (often denoted F). There are several good papers that describe how to do this. Once you have F, one very typical way to define the strain (e) is: e = 1/2(F^T * F) - I. This is known as Green's strain. It is invariant to rotations, which makes it very convenient.

3. Using the properties of the material you are trying to simulate (gelatin, rubber, steel, etc.), and using the strain you measured in the step above, derive the "stress" of each tetrahdron.

4. For each tetrahedron, visit each node (vertex, corner, point (these all mean the same thing)) and average the area-weighted normal vectors (in the rest shape) of the three triangular faces that share that node. Multiply the tetrahedron's stress by that averaged vector, and there's the elastic force acting on that node due to the stress of that tetrahedron. Of course, each node could potentially belong to multiple tetrahedra, so you'll want to be able to sum up these forces.

5. Integrate! There are easy ways to do this, and hard ways. Either way, you'll want to loop over every node in your world mesh and divide its forces by its mass to determine its acceleration. The easy way to proceed from here is to:

• Multiply its acceleration by some small time value dt. This gives you a change in velocity, dv.
• Add dv to the node's current velocity to get a new total velocity.
• Multiply that velocity by dt to get a change in position, dx.
• Add dx to the node's current position to get a new position.

This approach is known as explicit forward Euler integration. You will have to use very small values of dt to get it to work without blowing up, but it is so easy to implement that it works well as a starting point.

6. Repeat steps 2 through 5 for as long as you want.

I've left out a lot of details and fancy extras, but hopefully you can infer a lot of what I've left out. Here is a link to some instructions I used the first time I did this. The webpage contains some useful pseudocode, as well as links to some relevant material.

http://sealab.cs.utah.edu/Courses/CS6967-F08/Project-2/

The following link is also very useful:

http://sealab.cs.utah.edu/Courses/CS6967-F08/FE-notes.pdf

This is a really fun topic, and I wish you the best of luck! If you get stuck, just drop me a comment.

• +1 very clear! What metric do you use for the tetrahedron strain? The distance between opposite points? Commented Jan 26, 2012 at 9:18
• Good question! I'm sorry I left that out. I've edited my answer (particularly step 2) with some more information. The short answer is that you want some 3-dimensional measurement of the strain, but distance is 1-dimensional, so that won't work. Commented Jan 26, 2012 at 14:32

That rolling jelly cube video was made with Blender, which uses the Bullet physics engine for soft body simulation. The bullet documentation in general is very sparse and for soft body dynamics almost nonexistent. You're best bet would be to read the source code.

Then write your own version ;)

Here is a page with some pretty good tutorials on it. The one you are looking for is probably in the (inverse) Kinematics and Mass & Spring Models sections.

Hint: A jelly can be seen as a 3 dimensional cloth ;-)

Also, try having a look at the search results for spring pressure soft body model - they might get you going in the right direction :-)

See this guy's page Maciej Matyka, topic of soft body

Unfortunately 2d only but might be something to start with is JellyPhysics and JellyCar