Sweeping x-monotone pseudolines

Abstract

We study the problem of sweeping a pseudoline arrangement with n x-monotone curves with a rope (an x-monotone curve that connects the points at infinity). The rope can move by flipping over a face of the arrangement, replacing parts of it from the lower to the upper chain of the face. Counting as length of the rope the number of edges, what rope-length can be needed in such a sweep? We show that all such arrangements can be swept with rope-length at most 2n-2, and for some arrangements rope-length at least 7(n-2)/4+1 is required. We also discuss some complexity issues around the problem of computing a sweep with the shortest rope-length.