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 the following problem. Initially I create 10 points, in a 2-D space, randomly distributed and then I use the Voronoi function to creat polygons. But I want my Voronoi polyhedra to obey a gaussian-normal distribution. So the area of each polygon should obey this rule. But I cannot do this since my polyhedra are not convex but have vertices and corners outside the plot, extending to infinity. So what I want to do is to assign the crossing of the lines of the corresponding polygons with the borders of the plot. but how can I get the line intersections? I know the point inside the plot , but I donnot know anything about the point outside the plot.. Thank you very much for your help!


share|improve this question
Draw a picture. –  user635541 Mar 6 '11 at 19:51

3 Answers 3

You may better specify the terms of your problem

  1. Why your vertices got to infinity? Are random points choosen all over 2d plan or inside a specified area?
  2. Why you don't know nothing about other points?
share|improve this answer

You should probably calculate the intersections automatically. You would first need to detect the two lines which you would need to calculate. from there, you need will need two points on each line. (x1a, y1a), (x2a, y2a) and (x1b, y1b), (x2b, y2b)

from here, use the point-slope equation to find where these lines intersect:

if y-y1a=m(x-x1a) and m=(y2a-y1a)/(x2a-x1a)

share|improve this answer

i am using matlab for the code. Initially I take points within a square between x=[0,1] and y=[0,1]. Then I use the Voronoi function. The problem with this function is that it creates also unbound cells, with lines extgending to infinity. Try it for urself: x=rand(10,1) y=rand(10,1) voronoi(x,y)

I am using the points of the vertices as input for another modeller. But the points should be within that square. So I want to replace those points by points at the border of the square.

share|improve this answer

Your Answer


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.