A Linear Time Algorithm for the Maximum Overlap of Two Convex Polygons Under Translation
Abstract
Given two convex polygons P and Q with n and m edges, the maximum overlap problem is to find a translation of P that maximizes the area of its intersection with Q. We give the first randomized algorithm for this problem with linear running time. Our result improves the previous two-and-a-half-decades-old algorithm by de Berg, Cheong, Devillers, van Kreveld, and Teillaud (1998), which ran in O((n+m)(n+m)) time, as well as multiple recent algorithms given for special cases of the problem.
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