The theme of this paper is a rather simple method that has proved very potent in the analysis of the expected performance of various randomized algorithms and data structures in computational geometry. The method can be described as "analyze a randomized algorithm as if it were running backwards in time, from output to input." We apply this type of analysis to a variety of algorithms, old and new, and obtain solutions with optimal or near optimal expected performance for a plethora of problems in computational geometry, such as computing Delaunay triangulations of convex polygons, computing convex hulls of point sets in the plane or in higher dimensions, sorting, intersecting line segments, linear programming with a fixed number o...
Random projection is a simple geometric technique for reducing the dimensionality of a set of points...
This note combines the lazy randomized incremental construction scheme with the technique of \connec...
We describe a randomized algorithm for computing the trapezoidal decomposition of a simple polygon. ...
AbstractThis paper is not a complete survey on randomized algorithms in computational geometry, but ...
A summary of the results achieved in the paper "Optimal Randomized Parallel Algorithms for Comp...
International audienceThis paper is not a complete survey on randomized algorithms in computational ...
We describe general randomized reductions of certain geometric optimization problems to their corres...
AbstractResearch conducted over the past fifteen years has amply demonstrated the advantages of algo...
Computational geometry has developed many efficient algorithms for geometric problems in low dimensi...
We introduce a new randomized sampling technique, called Polling which has applications to deriving ...
Robustness problems of computational geometry algorithms is a topic that has been subject to intensi...
Computational geometry aims to design and analyze algorithms for solving geometric problem. It is a ...
Random number generators are widely used in practical algorithms. Examples include simulation, numbe...
SIGLEAvailable at INIST (FR), Document Supply Service, under shelf-number : 14802 E, issue : a.1992 ...
Randomized incremental constructions are widely used in computational geometry, but they perform ver...
Random projection is a simple geometric technique for reducing the dimensionality of a set of points...
This note combines the lazy randomized incremental construction scheme with the technique of \connec...
We describe a randomized algorithm for computing the trapezoidal decomposition of a simple polygon. ...
AbstractThis paper is not a complete survey on randomized algorithms in computational geometry, but ...
A summary of the results achieved in the paper "Optimal Randomized Parallel Algorithms for Comp...
International audienceThis paper is not a complete survey on randomized algorithms in computational ...
We describe general randomized reductions of certain geometric optimization problems to their corres...
AbstractResearch conducted over the past fifteen years has amply demonstrated the advantages of algo...
Computational geometry has developed many efficient algorithms for geometric problems in low dimensi...
We introduce a new randomized sampling technique, called Polling which has applications to deriving ...
Robustness problems of computational geometry algorithms is a topic that has been subject to intensi...
Computational geometry aims to design and analyze algorithms for solving geometric problem. It is a ...
Random number generators are widely used in practical algorithms. Examples include simulation, numbe...
SIGLEAvailable at INIST (FR), Document Supply Service, under shelf-number : 14802 E, issue : a.1992 ...
Randomized incremental constructions are widely used in computational geometry, but they perform ver...
Random projection is a simple geometric technique for reducing the dimensionality of a set of points...
This note combines the lazy randomized incremental construction scheme with the technique of \connec...
We describe a randomized algorithm for computing the trapezoidal decomposition of a simple polygon. ...