How Packed Is It, Really?

Abstract

The congestion of a curve is a measure of how much it zigzags around locally. More precisely, a curve π is c-packed if the length of the curve lying inside any ball is at most c times the radius of the ball, and its congestion is the minimum c for which π is c-packed. This paper presents a randomized 42-approximation algorithm for computing the congestion of a curve (or any set of segments in the plane). It runs in O( n 2 n) time and succeeds with high probability. Although the approximation factor is large, the running time improves over the previous fastest constant approximation algorithm, which took O(n4/3) time. We carefully combine new ideas with known techniques to obtain our new near-linear time algorithm.