In this paper we give a fast randomized algorithm for finding a partition of the plane induced by a given set of line segments. The planar partition problem is interesting because it has important practical implications, especially in computer graphics, which indeed served as an inspiration for our investigation. Our algorithm is ideally suited for a practical use because: (i) it is extremely simple and robust, and (ii) despite this simplicity (or rather because of it) the algorithm is optimal; its expected running time is O(m+n log n), where n is the number of input segments and m is the number of points of intersection. The storage requirement is O(m + n). Though the algorithm itself is simple, the global evolution of the underlying parti...
AbstractWe describe a parallel algorithm for testing a graph for planarity, and for finding an embed...
It is well known that the celebrated Lipton-Tarjan planar separation theorem, in a combination with ...
We present parallel algorithms for some fundamental problems in computational geometry which have ru...
In this paper we give a fast randomized algorithm for finding a partition of the plane induced by a ...
We introduce space-efficient plane-sweep algorithms for basic planar geometric problems. It is assum...
We present several variants of a new randomized incremental algorithm for computing a cutting in an ...
AbstractWe present a space-efficient algorithm for reporting all k intersections induced by a set of...
We describe a robust and efficient implementation of the Bentley-Ottmann sweep line algorithm based ...
For a set S of n line segments in the plane, we give the first work-optimal deterministic parallel a...
We prove new structural properties for tree-decompositions of planar graphs that we use to improve u...
AbstractChvátal gave a necessary condition for a partition to have a planar realization. It is of in...
We present parallel algorithms for some fundamental problems in computational geometry which have a ...
It is well known that the celebrated Lipton-Tarjan planar separation theorem, in a combination with ...
In this paper, we present an optimal parallel randomized algorithm for the Voronoi diagram of a set ...
We show that the well-known random incremental construction of Clarkson and Shor can be adapted via ...
AbstractWe describe a parallel algorithm for testing a graph for planarity, and for finding an embed...
It is well known that the celebrated Lipton-Tarjan planar separation theorem, in a combination with ...
We present parallel algorithms for some fundamental problems in computational geometry which have ru...
In this paper we give a fast randomized algorithm for finding a partition of the plane induced by a ...
We introduce space-efficient plane-sweep algorithms for basic planar geometric problems. It is assum...
We present several variants of a new randomized incremental algorithm for computing a cutting in an ...
AbstractWe present a space-efficient algorithm for reporting all k intersections induced by a set of...
We describe a robust and efficient implementation of the Bentley-Ottmann sweep line algorithm based ...
For a set S of n line segments in the plane, we give the first work-optimal deterministic parallel a...
We prove new structural properties for tree-decompositions of planar graphs that we use to improve u...
AbstractChvátal gave a necessary condition for a partition to have a planar realization. It is of in...
We present parallel algorithms for some fundamental problems in computational geometry which have a ...
It is well known that the celebrated Lipton-Tarjan planar separation theorem, in a combination with ...
In this paper, we present an optimal parallel randomized algorithm for the Voronoi diagram of a set ...
We show that the well-known random incremental construction of Clarkson and Shor can be adapted via ...
AbstractWe describe a parallel algorithm for testing a graph for planarity, and for finding an embed...
It is well known that the celebrated Lipton-Tarjan planar separation theorem, in a combination with ...
We present parallel algorithms for some fundamental problems in computational geometry which have ru...