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I've researched several algorithms for determining whether a point lies in a convex hull, but I can't seem to find any algorithm which can do the trick in O(logn) time, nor can I come up with one myself.Let a[] be an array containing the vertices of the convex hull, can I pre-process this array in anyway, to make it possible to check if a new point lies inside the convex hull in O(logn) time.

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  • You might also want to ask this question on the Mathematics site. It sounds like you are more interested in the algorithm itself rather than the implementation. Mar 2, 2015 at 2:31

1 Answer 1

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Looks like you can.

  1. Sort vertices in a[] by polar angle relative to one of vertices (call it A). O(N log N), like convex hull computation.
  2. Read point, determine its polar angle. O(1)
  3. Find two neighbor vertices, one of them should have polar angle less than point from step 2, and other should have angle bigger (B and C). O(log N), binary search
  4. Then simple geometry: draw the triangle between points from A, B, C and check if point from step 2 lies inside. O(1)
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  • what are pt. 1, 2 and 3 in this case, is pt. 1 the point being tested, and pt. 2 and 3 are nrighbouring points satisfying the condition in step 3? Mar 2, 2015 at 2:48
  • Also can you explain how step 3 is done in O(logn) time please Mar 2, 2015 at 2:49
  • no, sorry for my abbreviations :) pt.1 is item 1 (sort), pt.2 is item 2 (read point), etc.
    – Everv0id
    Mar 2, 2015 at 2:50
  • oh I see, but it's still possible for a point to not lie on the line connecting the neighbouring points and still be in the convex hull Mar 2, 2015 at 2:53
  • Seems like i misunderstood your problem. Do you mean that the point can lie inside convex hull?
    – Everv0id
    Mar 2, 2015 at 2:55

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