I'm looking for an algorithm to insert a new control point on a Bézier curve, without deforming.
Does anybody know a library or reference for Bézier algorithms (insertion, optimize, de Casteljau ...)?
I'm looking for an algorithm to insert a new control point on a Bézier curve, without deforming. Does anybody know a library or reference for Bézier algorithms (insertion, optimize, de Casteljau ...)? 


This is called the "knot insertion problem". For Bézier curves, the de Casteljau algorithm will give you the right answer. Here is the simple algorithm for a degree 3 Bézier. Say you want to insert a knot at a fraction
Then your first Bézier will be defined by: The geometrical interpretation is simple: you split each segment of the Bézier polygon at fraction Now it can get trickier if you want to insert the control point not at a specific value of 


You could also take the mathematical approach. A qubic Bézier curve with control points can be written as: Its derivative w.r.t. is To limit the curve from to , you get new control points : ProofSubstituting We get The first and last points of the subcurve are the first and last new control points And the tangent at those points is So 


Adding this for completeness. An opensource implementation of many Bézier path operations can be found inside GIMP source code, in 

