Reporting red-blue intersections between two sets of connected line segments

We present a new line sweep algorithm, HEAPSWEEP, for reporting bichromatic ("purple"). intersections between a red and a blue family of line segments. If the union of the segments in each family is connected as a point set, HEAPSWEEP reports all k purple intersections in time O ((n + k)alpha (n) log(3) n), where n is the total number of input segments and alpha(n) is the nearly constant inverse Ackermann function. To achieve these bounds, the algorithm maintains only partial information about the vertical ordering between curves of the same color, using a new data structure called a kinetic queue. In order to analyze the running time of HEAPSWEEP, we also show that a simple polygon containing a set of n line segments can be partitioned into monotone regions by a set of vertical threads cutting these segments O (n log n) times.