If computational geometry should play an important role in the professional environment (e.g. graphics and robotics), the data structures it advocates should be readily implemented and the algorithms efficient. In the paper, the uniform grid and a diverse set of geometric algorithms that are all based on it, are reviewed. The technique, invented by the second author, is a flat, and thus non-hierarchical, grid whose resolution adapts to the data. It is especially suitable for telling efficiently which pairs of a large number of short edges intersect. Several of the algorithms presented here exist as working programs (among which is a visible surface program for polyhedra) and can handle large data sets (i.e. many thousands of geometric objec...
We present a set of geometric algorithms for grid generation. Tehe implementation of the algorithms ...
AbstractComputers with multiple processor cores using shared memory are now ubiquitous. In this pape...
This dissertation develops and studies fast algorithms for solving closest point problems. Algorithm...
Introduction Numerical robustness, topological correctness, reliability, accuracy, and simultaneous...
Data structures which accurately determine spatial and topological relationships in large databases ...
Computational geometry emerged from the field of algorithms design and anal ysis in the late 1970s....
This thesis presents an exact parallel algorithm for computing the intersection be- tween two 3D tri...
Computers with multiple processor cores using shared mem-ory are now ubiquitous. In this paper, we p...
Geometric hierarchies have proven useful for the problems of point location in planar subdivisions a...
We present parallel algorithms for some fundamental problems in computational geometry which have ru...
Computational geometry is an integral part of mathematics and computer science deals with the algori...
A summary of the results achieved in the paper "Optimal Randomized Parallel Algorithms for Comp...
In these notes, which were originally written as lecture notes for Advanced School on Algorithmic Fo...
We present parallel algorithms for some fundamental problems in computational geometry which have a ...
The computer--aided solution to algorithmic problems is becoming more and more important in various ...
We present a set of geometric algorithms for grid generation. Tehe implementation of the algorithms ...
AbstractComputers with multiple processor cores using shared memory are now ubiquitous. In this pape...
This dissertation develops and studies fast algorithms for solving closest point problems. Algorithm...
Introduction Numerical robustness, topological correctness, reliability, accuracy, and simultaneous...
Data structures which accurately determine spatial and topological relationships in large databases ...
Computational geometry emerged from the field of algorithms design and anal ysis in the late 1970s....
This thesis presents an exact parallel algorithm for computing the intersection be- tween two 3D tri...
Computers with multiple processor cores using shared mem-ory are now ubiquitous. In this paper, we p...
Geometric hierarchies have proven useful for the problems of point location in planar subdivisions a...
We present parallel algorithms for some fundamental problems in computational geometry which have ru...
Computational geometry is an integral part of mathematics and computer science deals with the algori...
A summary of the results achieved in the paper "Optimal Randomized Parallel Algorithms for Comp...
In these notes, which were originally written as lecture notes for Advanced School on Algorithmic Fo...
We present parallel algorithms for some fundamental problems in computational geometry which have a ...
The computer--aided solution to algorithmic problems is becoming more and more important in various ...
We present a set of geometric algorithms for grid generation. Tehe implementation of the algorithms ...
AbstractComputers with multiple processor cores using shared memory are now ubiquitous. In this pape...
This dissertation develops and studies fast algorithms for solving closest point problems. Algorithm...