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# 3D Rotation Matrix deforms over time in Processing/Java

Im working on a project where i want to generate a 3D mesh to represent a certain amount of data.

To create this mesh i want to use transformation Matrixes, so i created a class based upon the mathematical algorithms found on a couple of websites.

Everything seems to work, scale/translation but as soon as im rotating a mesh on its x-axis its starts to deform after 2 to 3 complete rotations. It feels like my scale values are increasing which transforms my mesh. I'm struggling with this problem for a couple of days but i can't figure out what's going wrong.

To make things more clear you can download my complete setup here.

I defined the coordinates of a box and put them through the transformation matrix before writing them to the screen

This is the formula for rotating my object

void appendRotation(float inXAngle, float inYAngle, float inZAngle, PVector inPivot ) {

boolean setPivot = false;

if (inPivot.x != 0 || inPivot.y != 0 || inPivot.z != 0) {
setPivot = true;
}

// If a setPivot = true, translate the position
if (setPivot) {

// Translations for the different axises need to be set different
if (inPivot.x != 0) { this.appendTranslation(inPivot.x,0,0); }
if (inPivot.y != 0) { this.appendTranslation(0,inPivot.y,0); }
if (inPivot.z != 0) { this.appendTranslation(0,0,inPivot.z); }

}

// Create a rotationmatrix
Matrix3D rotationMatrix = new Matrix3D();

// xsin en xcos
// ysin en ycos
// zsin en zcos

// Rotate around x
rotationMatrix.setIdentity();
// --
rotationMatrix.matrix[1][1] = xCosCal;
rotationMatrix.matrix[1][2] = xSinCal;
rotationMatrix.matrix[2][1] = -xSinCal;
rotationMatrix.matrix[2][2] = xCosCal;
// Add rotation to the basis matrix
this.multiplyWith(rotationMatrix);

// Rotate around y
rotationMatrix.setIdentity();
// --
rotationMatrix.matrix[0][0] = yCosCal;
rotationMatrix.matrix[0][2] = -ySinCal;
rotationMatrix.matrix[2][0] = ySinCal;
rotationMatrix.matrix[2][2] = yCosCal;
// Add rotation to the basis matrix
this.multiplyWith(rotationMatrix);

// Rotate around z
rotationMatrix.setIdentity();
// --
rotationMatrix.matrix[0][0] = zCosCal;
rotationMatrix.matrix[0][1] = zSinCal;
rotationMatrix.matrix[1][0] = -zSinCal;
rotationMatrix.matrix[1][1] = zCosCal;
// Add rotation to the basis matrix
this.multiplyWith(rotationMatrix);

// Untranslate the position
if (setPivot) {

// Translations for the different axises need to be set different
if (inPivot.x != 0) { this.appendTranslation(-inPivot.x,0,0); }
if (inPivot.y != 0) { this.appendTranslation(0,-inPivot.y,0); }
if (inPivot.z != 0) { this.appendTranslation(0,0,-inPivot.z); }

}

}

Does anyone have a clue?

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What do you mean by "its starts to deform after 2 to 3 complete rotations"? How many matrix multiplications are these? Just an estimate is enough. – Ali Apr 26 '11 at 21:01

You never want to cumulatively transform matrices. This will introduce error into your matrices and cause problems such as scaling or skewing the orthographic components.

The correct method would be to keep track of the cumulative pitch, yaw, roll angles. Then reconstruct the transformation matrix from those angles every update.

-

If there is any chance: avoid multiplying rotation matrices. Keep track of the cumulative rotation and compute a new rotation matrix at each step.

If it is impossible to avoid multiplying the rotation matrices then renormalize them (page 16). It works for me just fine for more than 10 thousand multiplications.

However, I suspect that it will not help you, numerical errors usually requires more than 2 steps to manifest themselves. It seems to me the reason for your problem is somewhere else.

Yaw, pitch and roll are not good for arbitrary rotations. Euler angles suffer from singularities and instability. Look at 38:25 (presentation of David Sachs)

Good luck!

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Thanks for the references, normalizing is also an interesing aspect keeps the things straight. For now i use PMatrix3D but going to dive deeper into these arbitrary rotation methodes – Muhneer Apr 28 '11 at 7:29
OK, good luck anyhow! – Ali Apr 28 '11 at 10:12

As @don mentions, try to avoid cumulative transformations, as you can run into all sort of problems. Rotating by one axis at a time might lead you to Gimbal Lock issues. Try to do all rotations in one go.

Also, bare in mind that Processing comes with it's own Matrix3D class called PMatrix3D which has a rotate() method which takes an angle(in radians) and x,y,z values for the rotation axis.

Here is an example function that would rotate a bunch of PVectors:

PVector[] rotateVerts(PVector[] verts,float angle,PVector axis){
int vl = verts.length;
PVector[] clone = new PVector[vl];
for(int i = 0; i<vl;i++) clone[i] = verts[i].get();
//rotate using a matrix
PMatrix3D rMat = new PMatrix3D();
rMat.rotate(angle,axis.x,axis.y,axis.z);
PVector[] dst = new PVector[vl];
for(int i = 0; i<vl;i++) {
dst[i] = new PVector();
rMat.mult(clone[i],dst[i]);
}
return dst;
}

and here is an example using it.

HTH

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Ah thats extremely helpfull, for some reason i'v ignored that class but it fixxes most of my problems. perfect! – Muhneer Apr 28 '11 at 7:27

A shot in the dark: I don't know the rules or the name of the programming language you are using, but this procedure looks suspicious:

void setIdentity() {
this.matrix = identityMatrix;
}

Are you sure your are taking a copy of identityMatrix? If it is just a reference you are copying, then identityMatrix will be modified by later operations, and soon nothing makes sense.

-

Though the matrix renormalization suggested probably works fine in practice, it is a bit ad-hoc from a mathematical point of view. A better way of doing it is to represent the cumulative rotations using quaternions, which are only converted to a rotation matrix upon application. The quaternions will also drift slowly from orthogonality (though slower), but the important thing is that they have a well-defined renormalization.

Good starting information for implementing this can be:

A useful academic reference can be:

• K. Shoemake, “Animating rotation with quaternion curves,” ACM SIGGRAPH Comput. Graph., vol. 19, no. 3, pp. 245–254, 1985. DOI:10.1145/325165.325242
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