**Improving accuracy for cumulative matrices (Normalization)**

To **avoid degeneration** of transform matrix select one axis as main. I usually chose `Z`

as it is usually view or forward direction in my apps. Then exploit **cross product** to recompute/normalize the rest of axises (which should be perpendicular to each other and unless scale is used then also unit size). This can be done only for orthonormal matrices so no skew or projections ... Orthogonal matrices must be scaled to orthonormal then inverted and then scaled back to make this usable.

You do not need to do this after every operation just make a counter of operations done on each matrix and if some threshold crossed then normalize it and reset counter.

To **detect degeneration** of such matrices you can test for orthogonality by dot product between any two axises (should be zero or very near it). For orthonormal matrices you can test also for unit size of axis direction vectors ...

Here is how my transform matrix normalization looks like (for **orthonormal** matrices) in **C++**:

```
double reper::rep[16]; // this is my transform matrix stored as member in `reper` class
//---------------------------------------------------------------------------
void reper::orto(int test) // test is for overiding operation counter
{
double x[3],y[3],z[3]; // space for axis direction vectors
if ((cnt>=_reper_max_cnt)||(test)) // if operations count reached or overide
{
axisx_get(x); // obtain axis direction vectors from matrix
axisy_get(y);
axisz_get(z);
vector_one(z,z); // Z = Z / |z|
vector_mul(x,y,z); // X = Y x Z ... perpendicular to y,z
vector_one(x,x); // X = X / |X|
vector_mul(y,z,x); // Y = Z x X ... perpendicular to z,x
vector_one(y,y); // Y = Y / |Y|
axisx_set(x); // copy new axis vectors into matrix
axisy_set(y);
axisz_set(z);
cnt=0; // reset operation counter
}
}
//---------------------------------------------------------------------------
void reper::axisx_get(double *p)
{
p[0]=rep[0];
p[1]=rep[1];
p[2]=rep[2];
}
//---------------------------------------------------------------------------
void reper::axisx_set(double *p)
{
rep[0]=p[0];
rep[1]=p[1];
rep[2]=p[2];
cnt=_reper_max_cnt; // pend normalize in next operation that needs it
}
//---------------------------------------------------------------------------
void reper::axisy_get(double *p)
{
p[0]=rep[4];
p[1]=rep[5];
p[2]=rep[6];
}
//---------------------------------------------------------------------------
void reper::axisy_set(double *p)
{
rep[4]=p[0];
rep[5]=p[1];
rep[6]=p[2];
cnt=_reper_max_cnt; // pend normalize in next operation that needs it
}
//---------------------------------------------------------------------------
void reper::axisz_get(double *p)
{
p[0]=rep[ 8];
p[1]=rep[ 9];
p[2]=rep[10];
}
//---------------------------------------------------------------------------
void reper::axisz_set(double *p)
{
rep[ 8]=p[0];
rep[ 9]=p[1];
rep[10]=p[2];
cnt=_reper_max_cnt; // pend normalize in next operation that needs it
}
//---------------------------------------------------------------------------
```

The vector operations looks like this:

```
void vector_one(double *c,double *a)
{
double l=divide(1.0,sqrt((a[0]*a[0])+(a[1]*a[1])+(a[2]*a[2])));
c[0]=a[0]*l;
c[1]=a[1]*l;
c[2]=a[2]*l;
}
void vector_mul(double *c,double *a,double *b)
{
double q[3];
q[0]=(a[1]*b[2])-(a[2]*b[1]);
q[1]=(a[2]*b[0])-(a[0]*b[2]);
q[2]=(a[0]*b[1])-(a[1]*b[0]);
for(int i=0;i<3;i++) c[i]=q[i];
}
```

**Improving accuracy for non cumulative matrices**

Your only choice is use at least `double`

accuracy of your matrices. Safest is to use **GLM** or your own matrix math based at least on `double`

data type (like my `reper`

class).

Cheap alternative is using `double`

precision functions like

```
glTranslated
glRotated
glScaled
...
```

which in some cases helps but is not safe as **OpenGL** implementation can truncate it to `float`

. Also there are no 64 bit **HW** interpolators yet so all iterated results between pipeline stages are truncated to `float`

s.

Sometimes relative reference frame helps (so keep operations on similar magnitude values) for example see:

ray and ellipsoid intersection accuracy improvement

Also In case you are using own matrix math functions you have to consider also the order of operations so you always lose smallest amount of accuracy possible.

**Pseudo inverse matrix**

In some cases you can avoid computing of inverse matrix by determinants or Horner scheme or Gauss elimination method because in some cases you can exploit the fact that **Transpose of orthonormal rotational matrix is also its inverse**. Here is how it is done:

```
void matrix_inv(GLfloat *a,GLfloat *b) // a[16] = Inverse(b[16])
{
GLfloat x,y,z;
// transpose of rotation matrix
a[ 0]=b[ 0];
a[ 5]=b[ 5];
a[10]=b[10];
x=b[1]; a[1]=b[4]; a[4]=x;
x=b[2]; a[2]=b[8]; a[8]=x;
x=b[6]; a[6]=b[9]; a[9]=x;
// copy projection part
a[ 3]=b[ 3];
a[ 7]=b[ 7];
a[11]=b[11];
a[15]=b[15];
// convert origin: new_pos = - new_rotation_matrix * old_pos
x=(a[ 0]*b[12])+(a[ 4]*b[13])+(a[ 8]*b[14]);
y=(a[ 1]*b[12])+(a[ 5]*b[13])+(a[ 9]*b[14]);
z=(a[ 2]*b[12])+(a[ 6]*b[13])+(a[10]*b[14]);
a[12]=-x;
a[13]=-y;
a[14]=-z;
}
```

So rotational part of the matrix is transposed, projection stays as was and origin position is recomputed so `A*inverse(A)=unit_matrix`

This function is written so it can be used as in-place so calling

```
GLfloat a[16]={values,...}
matrix_inv(a,a);
```

lead to valid results too. This way of computing Inverse is quicker and numerically safer as it pends much less operations (no recursion or reductions **no divisions**). Of coarse **this works only for orthonormal homogenuous 4x4 matrices !!!***

**Detection of wrong inverse**

So if you got matrix `A`

and its inverse `B`

then:

```
A*B = C = ~unit_matrix
```

So multiply both matrices and check for unit matrix...

- abs sum of all non diagonal elements of
`C`

should be close to `0.0`

- all diagonal elements of
`C`

should be close to `+1.0`

`near = distance(camera, centerOfWorld) - radusOfWorld`

and`far = distance(camera, centerOfWorld) + radusOfWorld`

both when being outside of rounding box. When inside,`near=nearMin`

(say =1 unit, to see detail) and`far= 2*radiusOfWorld`

I don't bother with Z-fighting in this case. – Ripi2 Feb 17 '17 at 0:30