I have a bunch of coordinates which are the control points of a clamped uniform cubic B-spline on the 2D plane. I would like to draw this curve using Cairo calls (in Python, using Cairo's Python bindings), but as far as I know, Cairo supports Bézier curves only. I also know that the segments of a B-spline between two control points can be drawn using Bézier curves, but I can't find the exact formulae anywhere. Given the coordinates of the control points, how can I derive the control points of the corresponding Bézier curves? Is there any efficient algorithm for that?
Okay, so I searched a lot using Google and I think I came up with a reasonable solution that is suitable for my purposes. I'm posting it here - maybe it will be useful to someone else as well.
First, let's start with a simple
A cubic B-spline is nothing more than a collection of
Now, assume that we have an open uniform cubic B-spline instead of a clamped one. Four consecutive control points of a cubic B-spline define a single Bézier segment, so control points 0 to 3 define the first Bézier segment, control points 1 to 4 define the second segment and so on. The control points of the Bézier spline can be determined by linearly interpolating between the control points of the B-spline in an appropriate way. Let A, B, C and D be the four control points of the B-spline. Calculate the following auxiliary points:
A Bézier curve from E to H with control points F and G is equivalent to an open B-spline between points A, B, C and D. See sections 1-5 of this excellent document. By the way, the above method is called Böhm's algorithm, and it is much more complicated if formulated in a proper mathematic way that accounts for non-uniform or non-cubic B-splines as well.
We have to repeat the above procedure for each group of 4 consecutive points of the B-spline, so in the end we will need the 1:2 and 2:1 division points between almost any consecutive control point pairs. This is what the following
Finally, if we want to draw clamped B-splines instead of open B-splines, we simply have to repeat both endpoints of the clamped B-spline three more times:
Finally, this is how the code should be used: