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Given a set of points on a straight line segment. The points may lie anywhere on the line. I need an aglorithm to find the maximum number of points that lie on the line at regular intervals.

eg on a straight line denoted by y = 0, I may have some points like :

[3,0], [1,0], [4,0], [7,0],[11,0], [10,0]

Output : 4 
     [1,0] , [4,0], [7,0], [10,0]

Example 2:

[2,1], [2,5], [2,3], [2,7], [2,6]

Output: 4
    [2,1], [2,3],[2,5], [2,7]

[Note: the line may have any slope. I need only a sketch of the algorithm. The points may be considered to be stored in a 2-D matrix] please help.

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There is a very obvious naive algorithm for this. Are you fine with that or do you need something particularly efficient? –  hugomg Dec 14 '11 at 13:28
    
You could definitely put forth the idea, we can build on it and try and optimize it. :) –  letsc Dec 14 '11 at 13:35

2 Answers 2

Here is a brute-force algorithm in pseudo-code:

for each point X
  for each point Y != X
    find number of connected points from X using the distance between X and Y
  next Y
next X

How to find number of connected points from X using the distance between X and Y:

dXY = Y - X
i = 0
while point_exists(X + i * dXY)
  i = i + 1
end while
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I guess its going to exhibit exponential time complexity(due to the while loop) –  letsc Dec 14 '11 at 13:55
1  
the complexity should be quadratic or cubic (depending on how the innermost counting is implemented), but polynomial in all cases. –  fortran Dec 14 '11 at 13:57
    
The outer two for loops make it N^2. The inner while loop, for each i, tries to find a point that is at a distance of (i*dXY) from X, so the complexity for the while loop may be O(N^2). Hence overall complexity O(N^4) ? –  letsc Dec 14 '11 at 14:06
    
One thing : dXY = Y - X should have the appropriate negative or positive sign(depending on whether Y is on the left of X or on the right of X or top or below x). –  letsc Dec 14 '11 at 14:12
    
The while loop is O(N^2) worst case. X + i * dXY is a specific point. Checking the existance of a point in a set is not costlier than O(N). –  Klas Lindbäck Dec 14 '11 at 15:00

Choose one coordinate with non-zero (or just wider) range (e.g. X for the first example) and sort your set by this coordinate. Then find Longest Arithmetic Progression

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