# How to find maximum number of intersectionS through set of line segments [closed]

Suppose I am given number of lines segments in Cartesian coordinate system.Each line is given as [x0,y0] and [x1,y1].Algorithm should find a perpendicular that cross maximum number of lines. In this example it crosses four lines:

What algorithm can do it with minimum complexity?(i would prefer c++ but some kind of pseudo code is OK too)

P.S The point to think about is when several lines start/end in the same x coordinate

Thank you.

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## closed as not a real question by Mat, Bo Persson, Jeff Atwood♦May 20 '11 at 6:33

It's difficult to tell what is being asked here. This question is ambiguous, vague, incomplete, overly broad, or rhetorical and cannot be reasonably answered in its current form. For help clarifying this question so that it can be reopened, visit the help center.If this question can be reworded to fit the rules in the help center, please edit the question.

the algorithm question is essentially off-topic here IMO, and you haven't showed the slightest effort in starting to answer this yourself. that's not how this site works. – Mat May 17 '11 at 21:07
Even the fifth line intersects the perpendicular line, if extended. In short, every line intersects every other line if not parallel. – Mahesh May 17 '11 at 21:07
If they're lines the perpendicular will cross all of them, unless the lines themselves are vertical. If we're talking about line segments, on the other hand ... – John May 17 '11 at 21:08
@Mahesh No that not what question about the lines segments are closed and cannot be extended – user728111 May 17 '11 at 21:09
Yes John you right I have fixed the question – user728111 May 17 '11 at 21:11

1. Convert each line to a interval of [x_start,x_end] for each segment.
2. Create a datastructure that contains a flag for whether it is a start or end point, as well as the point value.
3. Sort all the points and then iterate through them incrementing a counter when you hit a start point and decrementing a counter when you hit an end point. Keep track of the maximum value.
4. Repeat with the Y values if desired.

O(n lg n) time complexity

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Beat me to it by a minute. I was going to suggest the same thing. You're right, the y values are completely irrelevant to the question. – Mark Peters May 17 '11 at 21:17
Similar to what I had thought of but better. +1 – John May 17 '11 at 21:19
what about if two lines start/end at the same x? – user728111 May 17 '11 at 21:22
@zaya - Good point. It depends on how you want to handle it. One way would be to sort the list by point and then by start/end. That way you would hit the starts first to get the overlap if that was indeed the maximum place. – dfb May 17 '11 at 21:24
Only works if the solution line is along the Y axis. He doesn't state that as a requirement but it is pictured that way. – Jay May 17 '11 at 21:52

If you want perpendicular, then here `y` aren't needed. The algorithm is following.

1. Sort lines to x0 be lower-equal to x1
2. put all points to seperate array in sorted orden and with point store a flag which tells if the point is start or end of line
3. Run on array and get the segment which belong in maximal number of given intervals

``````vector<pair<double, unsigned char> > points; // (point, flag) pairs
//read [x0, x1]s to points, be sure that x0 <= x1 (swap them otherwise)
//0 for x0, 1 for x1
sort(points.begin(), points.end());
int ans = 0;
int curstate = 0;
for(int i = 0; i < points.size(); ++i)
{
if(points[i].second == 0)
++curstate;
else
--curstate;
ans = max(ans, curstate);
}
``````
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what about if two lines start/end at the same x? – user728111 May 17 '11 at 21:27
@zaya Yes you are right. In that case it is better to store not bool flag but integer(char) (say 0 for x0, and 1 for x1), and automaticali in your array at first will go <x0, 0> then <x1, 1>, so the answer will be correct. Now fixed to keep variable of type `char` as flag. – Mihran Hovsepyan May 17 '11 at 21:29

Iterate through the combinations of the existing lines. Build a list for each iteration containing all the other lines that are not perpendicular to the current line. Sort the lists into descending order by size. The (first) list with the largest size will be the solution. It will contain a list of lines that are crossed. There are an infinite number of lines that would be solutions. Send some of your salary to me as a royalty ;)

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