An Output Sensitive Algorithm for Discrete Convex Hulls
Abstract
δConvexHull L Z Given a convex body C in the plane, its discrete hull is C0 = ( C ), where = × is the integer lattice. We present an O( |C0| (C) )-time algorithm for calculating the discrete hull of C, where |C0| denotes the number of vertices of C0, and (C) is the diameter of C. Actually, using known combinatorial bounds, the running time of the algorithm is O((C)2/3 (C)). In particular, this bound applies when C is a disk.
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