# 2d space dividing by m lines

It has been years since I wrote any program... so I need your help and advice.

I looking for an general algorithm to solve following problem:

There is an flat (2d) space in form of rectangle, by given dimensions axb. Divide the space with given m- lines that takes given n-lengths. Lines can meet in nodes but can not be more lines in one node then given k.

Here there is an example http://i.stack.imgur.com/YzJ4a.png

let's assume that i.e. n2 is equal to another n2 etc -i know that on the picture is not exactly

maybe you can recommend literature that help me to solve that problem?

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I think the confusing part here is what you consider to be "lines". When I first looked at your diagram, it appeared to contain 4 lines, because all of your labelled line segments happen to form straight lines from one side of the rectangle to another side. Is that just coincidence? For example, do n1, n2, and n4 in your diagram have to be co-linear, or could you for example rotate n2 a little clockwise and n1 a little counter clockwise to make a crooked path from the bottom side to the top side? –  mbeckish Nov 20 '12 at 16:46
You are right. It is just coincidence or one of possible solutions I have made a new sketch. [1]: i.stack.imgur.com/ouVRL.png –  Furionpl Nov 20 '12 at 17:12
Let's simplify. How to divide a 2d space with given segments(lines). –  Furionpl Nov 20 '12 at 18:26
The problem sounds interesting, but poorly described. Can I not use all the m lines? Can some lines divide the space in shape of a polygon which is disconnected from the other lines and the border? Can there be a line end with doesn't connect with anything? You need to have a clearer picture of the problem and describe it well to get any answer. –  Billiska Nov 21 '12 at 1:59
solution depends on the values of m and k. it wouldn't if the line segments were all of different length. –  ashley Nov 23 '12 at 4:48
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