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I have read some tutorials for bezier curve such as this one http://www.codeproject.com/KB/recipes/BezirCurves.aspx.

The basic idea to create bezier curve is to use some control points and make decision how many new points need to be created. And then interpolate those new points.

Here is the question:

Assume I have 1000 points and I would like to interpolate 2000 points more. The number of control points I want to use is 5. The parameter t is in the range of [0, 1].

Givens points P0, P1, P2, P3, P4, P5, P6, ...P1000. I can use P0-P4 to generate new points, then what's next? use P5-P9 to generate new points??? I can immediately see there is a sudden transform between P4 and P5.

How can I solve this issue?

Thank you

///////////////////////////////////////////////////// Hello Stargazer712,

I understand your comments until it reaches the implementation method.

Assume we have the following points:

A1->A2->A3->A4->A5->A6->A7->A8 initial points

You said that we need to add a new point at the midpoint of every other pair.

My question is what the order of the new point is?

Let use use this annotation (A1+A3)/2 == A12

Now generated new points are

A13 A24 A35 A46 A57 A68 (this is what you mean "every other pair"?

Where should I insert those points into the original list?

The contour I am working on is extracted from binary image. The generated contour is zig-zag shape. After I apply this smooth method, it shape doesn't improve too much. I think the major reason is that the neighbors are near each other and make the interpolation not that useful.

Thank you

////////////////////////////////////////////////////

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1 Answer 1

up vote 10 down vote accepted

I think what you are trying to do is to create a smooth curve interpolating the points. To do this, you need to understand the following about Bezier curves:

Say we have two curves with points A1, A2, A3, A4, and B1, B2, B3, and B4.

If the two curves end on the same point, and if the last control point of the first is colinear with the first control point of the next, then the curves will be smooth. So in our example, if:

  • A4 == B1
  • A3, A4, and B2 are colinear (same as saying A3, B1, B2 are colinear)

Then the curves will be smooth.

In order to take an arbitrary list of points and make a smooth curve, we need to force these two conditions to be true.

To do this, lets say that we start with a set of points:

Initial Points

To force the above conditions, lets add some extra points. We'll place a new point at the midpoint of every other pair as shown:

With meta points

We can now draw bezier curves between points 0-3, 3-6, 6-9, etc., and we can be sure that it will form a smooth curve:

Curve drawn

Hope this helps!

EDIT: Here's a simple python program that implements exactly what was shown above (and I mean exactly). You need to have python and PIL installed:

from PIL import Image
import math

#
#   draws a single point on our image
#
def drawPoint( img, loc, size=5, color=(0,0,0) ):
    px = img.load()
    for x in range(size):
        for y in range(size):
            xloc = loc[0] + x - size/2
            yloc = loc[1] + y - size/2
            px[ xloc, yloc ] = color


#
#   draws a simple bezier curve with 4 points
#            
def drawCurve( img, points ):

    steps = 20
    for i in range(steps):

        t = i / float(steps)

        xloc = math.pow(1-t,3) * points[0][0] \
             + 3*t*math.pow(1-t,2) * points[1][0] \
             + 3*(1-t)*math.pow(t,2) * points[2][0] \
             + math.pow(t,3) * points[3][0]
        yloc = math.pow(1-t,3) * points[0][1] \
             + 3*t*math.pow(1-t,2) * points[1][1] \
             + 3*(1-t)*math.pow(t,2) * points[2][1] \
             + math.pow(t,3) * points[3][1]

        drawPoint( img, (xloc,yloc), size=2 )


#
#   draws a bezier curve with any number of points
#
def drawBezier( img, points ):

    for i in range(0,len(points),3):
        if( i+4 < len(points) ):
            drawCurve( img, points[i:i+4] )


#
#   draws a smooth bezier curve by adding points that
#   force smoothness
#
def drawSmoothBezier( img, points ):

    newpoints = []

    for i in range(len(points)):

        # add the next point (and draw it)
        newpoints.append(points[i])
        drawPoint( img, points[i], color=(255,0,0) )

        if( i%2 == 0 and i>0 and i+1<len(points) ):

            # calculate the midpoint
            xloc = (points[i][0] + points[i+1][0]) / 2.0
            yloc = (points[i][1] + points[i+1][1]) / 2.0

            # add the new point (and draw it)
            newpoints.append( (xloc, yloc) )
            drawPoint( img, (xloc, yloc), color=(0,255,0) )

    drawBezier( img, newpoints )



#   Create the image
myImage = Image.new("RGB",(627,271),(255,255,255))

#   Create the points
points = [  (54,172), 
            (121,60), 
            (220,204), 
            (284,56), 
            (376,159), 
            (444,40), 
            (515,228), 
            (595,72) ]

#   Draw the curve
drawSmoothBezier( myImage, points )

#   Save the image
myImage.save("myfile.png","PNG")

The line will follow the pattern of the points. If your result is zig-zagged, that's because that's what the lines looked like.

share|improve this answer
    
Hello Stargazer712, I have posted new questions based on your comments. please see the post under my original question. thank you –  q0987 Aug 18 '10 at 20:17
    
@q0987 - The program to draw a bezier curve is extremely simple. I hope an example answers any questions you might have. –  Stargazer712 Aug 18 '10 at 22:49
    
Thank you so much for your great helps. Your coding style looks perfect:) –  q0987 Aug 19 '10 at 3:27
    
Can you label A1, A2, ... B4 of your image? –  user123321 Sep 25 '13 at 23:08
    
A1 through B4 represent the control points of ANY two bezier curves (for example in curve A, A1 is the start point, A4 is the end point, and A2 and A3 are the control points), so it depends on how you are looking at the image (as there are three bezier curves drawn total). If I had to give a labels to them, then I would say (from left to right) that the first three red points are A1, A2, and A3. The green point is both A4 and B1. The next three red points are B2, B3, and B4. Everything gets shifted over to look at the next bezier curve. –  Stargazer712 Sep 26 '13 at 3:50
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