# Find all collinear points in a given set

This is an interview question: "Find all collinear points in a given set".

As I understand, they ask to print out the points, which lie in the same line (and every two points are always collinear). I would suggest the following.

1. Let's introduce two types `Line` (pair of doubles) and `Point` (pair of integers).
2. Create a multimap : `HashMap<Line, List<Point>)`
3. Loop over all pairs of points and for each pair: calculate the `Line` connecting the points and add the line with those points to the multimap.

Finally, the multimap contains the lines as the keys and a list collinear points for each line as its value.

The complexity is O(N^2). Does it make sense ? Are there better solutions ?

-
I'm getting a feeling that this is not complete problem description. Some part was lost. –  Nikita Rybak Dec 29 '10 at 21:08
Why do you think so ? –  Michael Dec 29 '10 at 21:10
@Michael Exactly as you said, n^2 solution is trivial and there's no better: result size is proportional to n^2. –  Nikita Rybak Dec 29 '10 at 21:14
BTW, you can't represent any line with a pair of integers, you'll need a pair of real numbers. –  Nikita Rybak Dec 29 '10 at 21:15
@Michael Yeah, but this is the problem not requiring any thinking or algorithm. It's like asking to sum up squares of values in the NxN matrix. How do you solve it? You go through all values and add each squared to the result. –  Nikita Rybak Dec 29 '10 at 21:32

Collinear here doesn't really make sense unless you fix on 2 points to begin with. So to say, "find all collinear points in a given set" doesn't make much sense in my opinion, unless you fix on 2 points and test the others to see if they're collinear.

Maybe a better question is, what is the maximum number of collinear points in the given set? In that case, you could fix on 2 points (just use 2 loops), then loop over the other points and check that the slope matches between the fixed points and the other points. You could use something like this for that check, assuming the coordinates are integer (you could change parameter types to double otherwise).

``````// ++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++
// Returns whether 3 points are collinear
// ++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++++
bool collinear(int x1, int y1, int x2, int y2, int x3, int y3) {
return (y1 - y2) * (x1 - x3) == (y1 - y3) * (x1 - x2);
}
``````

So the logic becomes:

``````int best = 2;
for (int i = 0; i < number of points; ++i) {
for (int j = i+1, j < number of points; j++) {
int count = 2;
for (int k = 0; i < number of points; ++k) {
if (k==i || k==j)
continue;

check that points i, j and k are collinear (use function above), if so, increment count.
}
best = max(best,count);
}
}
``````
-
Well, for this problem you could do better, in O(n^2*logn), but I'm not sure if I should post an answer to the modified question :) but +1 anyway. –  Nikita Rybak Dec 29 '10 at 21:16
@Nikita - It was just the first thing I thought of. The other idea I had was using a bitmask and testing all possible sets of points from original sets, but I wasn't sure how big his original set of points was. But hey, you're the red TC algo guy, so your word has more weight than mine, I'd say post your answer if you have better ideas :). –  dcp Dec 29 '10 at 21:20
Let's ask author if he approves changing the subject :) Or I could email you, the idea is real simple. –  Nikita Rybak Dec 29 '10 at 21:35
Wouldn't this algo run in O(n^3)? –  DivKis01 Feb 14 '13 at 12:01
Why is calculating slope between i and j important if it never userd later on? –  Maggie Nov 23 '13 at 20:13

solve the problem in dual plane, convert all the points in to line segments. And then run a plane sweep to report all the intersections. The lines in the dual plane will pass through same point represents collinear points. And the plane sweep can be done in O(nlogn) time.

-
One might want to add, that constructing the dual line arrangement takes O(n^2). –  user695652 Feb 3 at 19:11

I think the intent is to find a line which passes through maximum number of points or identify this set of collinear points. This link gives a N^2(logN) solution to this problem

-
I think the solution above solves this problem too in O(N^2) :) –  Michael Dec 30 '10 at 15:19

Take a look at the two methods described in http://www.cs.princeton.edu/courses/archive/spring03/cs226/assignments/lines.html .

To find 4 or more collinear points given N points, the brute-force method has a time complexity of O(N^4), but a better method does it in O(N^2 log N).

-