Given a set of n points in an XY plane, how can I determine if every point is at least separated by every other point by a Manhattan distance of 5 units in time less than O(n^2)?
What is the best algorithm to implement this?
Thank you.
Given a set of n points in an XY plane, how can I determine if every point is at least separated by every other point by a Manhattan distance of 5 units in time less than O(n^2)? What is the best algorithm to implement this? Thank you. 


This algorithm is For true it is simple  it follows from the fact that there is a maximum number of other points that can be squeezed in a 20x10 box without 2 getting within 5. For false it is trickier, you can have a lot of other points in that box, but by the time you have compared a fixed number of them to the rest, you must have found two within distance 5. Either way a given point participates in a fixed maximum number of point to point comparisons before you have your answer. 

