Balanced convex partitions of lines in the plane
Abstract
We prove an extension of a ham sandwich theorem for families of lines in the plane by Dujmovi\'c and Langerman. Given two sets A, B of n lines each in the plane, we prove that it is possible to partition the plane into r convex regions such that the following holds. For each region C of the partition there is a subset of cr n1/r lines of A whose pairwise intersections are in C, and the same holds for B. In this statement cr only depends on r. We also prove that the dependence on n is optimal.
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