Take the 2-minute tour ×
Stack Overflow is a question and answer site for professional and enthusiast programmers. It's 100% free, no registration required.

I have a set of points which approximate a 2D curve. I would like to use Python with numpy and scipy to find a cubic Bézier path which approximately fits the points, where I specify the exact coordinates of two endpoints, and it returns the coordinates of the other two control points.

I initially thought scipy.interpolate.splprep() might do what I want, but it seems to force the curve to pass through each one of the data points (as I suppose you would want for interpolation). I'll assume that I was on the wrong track with that.

My question is similar to this one: How can I fit a Bézier curve to a set of data?, except that they said they didn't want to use numpy. My preference would be to find what I need already implemented somewhere in scipy or numpy. Otherwise, I plan to implement the algorithm linked from one of the answers to that question, using numpy: An algorithm for automatically fitting digitized curves.

Thank you for any suggestions!

Edit: I understand that a cubic Bézier curve is not guaranteed to pass through all the points; I want one which passes through two given endpoints, and which is as close as possible to the specified interior points.

share|improve this question

5 Answers 5

up vote 1 down vote accepted

Here is a piece of python code for fitting points:

'''least square qbezier fit using penrose pseudoinverse
V=array
E,  W,  N,  S =  V((1,0)), V((-1,0)), V((0,1)), V((0,-1))
cw = 100
ch = 300
cpb = V((0, 0))
cpe = V((cw, 0))
cp=[cpb,cpb+ch*N+E*cw/8,cpe+ch*N+E*cw/8, cpe]            
ts = V(range(11))/10
M = bezierM (ts)
points = M*xys #produces the points on the bezier curve at t in ts
control_points=lsqfit(points, M)
linalg.norm(control_points-xys)<10e-5
control_points.tolist()
'''
from numpy import array, linalg, matrix
from scipy.misc import comb as nOk
Mtk = lambda n, t, k: t**(k)*(1-t)**(n-k)*nOk(n,k)
bezierM = lambda ts: matrix([[Mtk(3,t,k) for k in range(4)] for t in ts])
def lsqfit(points,M):
    M_ = linalg.pinv(M)
    return M_ * points

Generally on bezier curves check out Animated bezier and bezierinfo

share|improve this answer
    
This sounds more like what I'm looking for, thank you. I'm trying to understand what the variable xys in the commented example should be. The two links are very useful, I'm reading "bezierinfo" and will report back here if it clears things up. –  Craig Baker Apr 3 '13 at 21:28
    
It seems that the example contains a few errors. First, the line that starts with ts = V... rounds all of the ts to integers 0 or 1; adding the argument dtype='float' fixes this. Second, the variable xys is introduced erroneously, and should be replaced with points in all instances, where points is an array of data points to fit having shape [t, 2]. Let me know if I'm incorrect. The paper Bézier curve fitting helped me to understand this approach. Accepting answer since it is the only one to address Bézier curve fitting. –  Craig Baker Apr 23 '13 at 17:55

Here's a way to do Bezier curves with numpy:

import numpy as np
from scipy.misc import comb

def bernstein_poly(i, n, t):
    """
     The Bernstein polynomial of n, i as a function of t
    """

    return comb(n, i) * ( t**(n-i) ) * (1 - t)**i


def bezier_curve(points, nTimes=1000):
    """
       Given a set of control points, return the
       bezier curve defined by the control points.

       points should be a list of lists, or list of tuples
       such as [ [1,1], 
                 [2,3], 
                 [4,5], ..[Xn, Yn] ]
        nTimes is the number of time steps, defaults to 1000

        See http://processingjs.nihongoresources.com/bezierinfo/
    """

    nPoints = len(points)
    xPoints = np.array([p[0] for p in points])
    yPoints = np.array([p[1] for p in points])

    t = np.linspace(0.0, 1.0, nTimes)

    polynomial_array = np.array([ bernstein_poly(i, nPoints-1, t) for i in range(0, nPoints)   ])

    xvals = np.dot(xPoints, polynomial_array)
    yvals = np.dot(yPoints, polynomial_array)

    return xvals, yvals


if __name__ == "__main__":
    from matplotlib import pyplot as plt

    nPoints = 4
    points = np.random.rand(nPoints,2)*200
    xpoints = [p[0] for p in points]
    ypoints = [p[1] for p in points]

    xvals, yvals = bezier_curve(points, nTimes=1000)
    plt.plot(xvals, yvals)
    plt.plot(xpoints, ypoints, "ro")
    for nr in range(len(points)):
        plt.text(points[nr][0], points[nr][1], nr)

    plt.show()
share|improve this answer
    
Thank you for the information, but this does not appear to be an algorithm for fitting a Bézier curve, it is an algorithm for evaluating a given Bézier curve. –  Craig Baker Apr 23 '13 at 18:09

Short answer: you don't, because that's not how Bezier curve work. Longer answer: have a look at Catmull-Rom splines instead. They're pretty easy to form (the tangent vector at any point P, barring start and end, is parallel to the lines {P-1,P+1}, so they're easy to program, too) and always pass through the points that define them, unlike Bezier curves, which interpolates "somewhere" inside the convex hull set up by all the control points.

share|improve this answer
    
Thank you for the response, but I'm not looking for a curve that exactly passes through each point in the set, I'm looking for the Bezier curve which approximately fits the points. –  Craig Baker Sep 10 '13 at 21:57
    
sorry, which is it: "exactly", or "approximately"? The answer you picked is a linear regression polynomial fitting. That's an approximate curve. If you need exact, unless you have only as many points as the curve order you need, getting a true Bezier curve is almost guaranteed impossible, unless you want a poly-Bezier curve, in which case you can just do piecewise curve fitting, and then a catmull rom split is far more useful (and converts to, and from, a poly-Bezier curve) –  Mike 'Pomax' Kamermans Sep 11 '13 at 0:52
    
Approximately. I understand that a single cubic bezier is not guaranteed to be able pass through more than three given points. I'm not sure why I've gotten several responses restating this information, I tried to make it clear in the original question but maybe I was unclear. –  Craig Baker Sep 12 '13 at 3:33

A Bezier curve isn't guaranteed to pass through every point you supply it with; control points are arbitrary (in the sense that there is no specific algorithm for finding them, you simply choose them yourself) and only pull the curve in a direction.

If you want a curve which will pass through every point you supply it with, you need something like a natural cubic spline, and due to the limitations of those (you must supply them with increasing x co-ordinates, or it tends to infinity), you'll probably want a parametric natural cubic spline.

There are nice tutorials here:

Cubic Splines

Parametric Cubic Splines

share|improve this answer
2  
Thank you for the information, but I must not have specified the question clearly enough. I understand that a cubic Bézier curve is not guaranteed to pass through all the points; I want one which passes through two given endpoints, and which is as close as possible to the specified interior points. –  Craig Baker Sep 28 '12 at 18:47

What Mike Kamermans said is true, but I also wanted to point out that, as far as I know, catmull-rom splines can be defined in terms of cubic beziers. So, if you only have a library that works with cubics, you should still be able to do catmull-rom splines:

share|improve this answer

Your Answer

 
discard

By posting your answer, you agree to the privacy policy and terms of service.

Not the answer you're looking for? Browse other questions tagged or ask your own question.