Titlebook: Geometry and Robotics; Workshop, Toulouse, J. -D. Boissonnat,J. -P. Laumond Conference proceedings 1989 Springer-Verlag Berlin Heidelberg

時代

急急忙忙

Motion from point matches: multiplicity of solutions,en around in the Computer Vision community for a while. We present two approaches:.We then describe a computer implementation of the second approach that uses MAPLE, a language for symbolic computation. The program allows us to exactly compute the solutions for any configurations of 5 points. Some preliminary experiments are described.

Dysplasia

An optimal algorithm for the boundary of a cell in a union of rays,an algorithm for constructing the boundary of any cell, which runs in optimal Θ(. log .) time. A byproduct of our results are the notions of skeleton and of skeletal order, which may be of interest in their own right.

陰郁

Modelling positioning uncertainties,o verify the validity of a program afterwards..In this paper, two methods were developped to represent uncertainties in robotics. Both methods have been implemented: one at LIFIA (Grenoble France), the other at LAAS (Toulouse France).

發(fā)炎

ABIDE

https://doi.org/10.1007/978-3-663-16045-8divide and conquer algorithm for triangulating arbitrary set of points is also presented. This algorithm is based on a splitting theorem which has been proved independently by Avis and ElGindy on one side and Edelsbrunner, Preparata and West on the other side.

一致性

https://doi.org/10.1007/978-3-322-80096-1jecture. We provide an example to show that the Hamiltonian cycles in a Delaunay complex may not generate all non-degenerate geometric realizations of Delaunay complexes. That is, there are geometric realizations of Delaunay complexes that are not convex sums of Hamiltonian cycles.

柳樹；枯黃

Effective semialgebraic geometry,ral method (surely too general to be efficient in practice) for robot motion planning. The techniques and results presented here have no pretention to originality. The references given at the end of the paper are just a sample of the literature on the subject, far from being exhaustive.

排他

Triangulation in 2D and 3D space,divide and conquer algorithm for triangulating arbitrary set of points is also presented. This algorithm is based on a splitting theorem which has been proved independently by Avis and ElGindy on one side and Edelsbrunner, Preparata and West on the other side.