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.
1 Answer
Looks like you can.
- Sort vertices in
a[]
by polar angle relative to one of vertices (call it A). O(N log N), like convex hull computation. - Read point, determine its polar angle. O(1)
- 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
- 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
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no, sorry for my abbreviations :) pt.1 is item 1 (sort), pt.2 is item 2 (read point), etc.– Everv0idMar 2, 2015 at 2:50
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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
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Seems like i misunderstood your problem. Do you mean that the point can lie inside convex hull?– Everv0idMar 2, 2015 at 2:55