Sciweavers

FOCS
1999
IEEE

Taking a Walk in a Planar Arrangement

14 years 3 months ago
Taking a Walk in a Planar Arrangement
We present a randomized algorithm for computing portions of an arrangement of n arcs in the plane, each pair of which intersect in at most t points. We use this algorithm to perform online walks inside such an arrangement (i.e., compute all the faces that a curve, given in an online manner crosses), and to compute a level in an arrangement, both in an output-sensitive manner. The expected running time of the algorithm is O(t+2(m + n) log n), where m is the number of intersections between the walk and the given arcs. No similarly efficient algorithm is known for the general case of arcs. For the case of lines and for certain restricted cases involving line segments, our algorithm improves the best known algorithm of [OvL81] by almost a logarithmic factor.
Sariel Har-Peled
Added 03 Aug 2010
Updated 03 Aug 2010
Type Conference
Year 1999
Where FOCS
Authors Sariel Har-Peled
Comments (0)