# Bezier Curve Arc-Length Parameterization

I'm learning about Bezier curves and would like to parameterize the equations for distance using an estimation method. So far, my code seems to work for single points (EG Bezier(start=0, mid=1, end=5, nPoints=6) yields [0 1 2 3 4 5]). However, when I attempt to apply this to multi-dimensional curves, my results are not as expected.

C# code (executed in Unity for visualization). The function (should) get a point on the curve (defined by the points pts) at a length l% of the length.

Vector3 BezierL(Vector3[] pts, float l)
{
int i;
float[] tVals = new float[n];
Vector3[] points = new Vector3[n];
float[] cumDist = new float[n];
for (i = 1; i < n; i++)
{
tVals[i] = i / (float)(n - 1);
points[i] = Bezier(pts, tVals[i]);
cumDist[i] = cumDist[i - 1] +
(points[i] - points[i - 1]).magnitude;
}
// Interpolate to estimate t
float targetLen = l * cumDist[n - 1];
int ind = Array.BinarySearch(cumDist, targetLen);
if (ind < 0)
ind = ~ind;
float t = Mathf.Lerp(tVals[ind - 1], tVals[ind],
(targetLen - cumDist[ind - 1]) / (cumDist[ind] - cumDist[ind - 1]));
return Bezier(pts, t);
}

where Bezier(Vector3[] pts, t) gets a point on the curve defined by pts at time t. For whatever reason, this partially works in that all points are equally spaced, but some points are stacked at the initial point rather than being distributed along the curve.

This was my reference for developing this algorithm, so I'm unsure if my implementation is incorrect, or if it only applies to lower-dimensional curves.