Depth contours in arrangements of halfplanes
Abstract
Let H be a set of n halfplanes in R2 in general position, and let k<n be a given parameter. We show that the number of vertices of the arrangement of H that lie at depth exactly k (i.e., that are contained in the interiors of exactly k halfplanes of H) is O(nk1/3 + n2/3k4/3). The bound is tight when k=(n). This generalizes the study of Dey [Dey98], concerning the complexity of a single level in an arrangement of lines, and coincides with it for k=O(n1/3).
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