Title :
Randomness and geometric features in computer vision
Author :
Pennec, Xavier ; Ayache, Nicholas
Author_Institution :
EPIDAURE Project, Inst. Nat. de Recherche en Inf. et Autom., Antipolis, France
Abstract :
It is often necessary to handle randomness and geometry in computer vision, for instance to match and fuse together noisy geometric features such as points, lines or 3D frames, or to estimate a geometric transformation from a set of matched features. However, the proper handling of these geometric features is far more difficult than for points, and a number of paradoxes can arise. We analyse in this article three basic problems: (1) what is a uniform random distribution of features, (2) how to define a distance between features, and (3) what is the “mean feature” of a number of feature measurements, and we propose generic methods to solve them
Keywords :
computational geometry; computer vision; object recognition; 3D frames; computer vision; feature measurements; generic methods; geometric features; geometric transformation; lines; matched features; mean feature; noisy geometric features; points; randomness; uniform random distribution; Additive noise; Algorithm design and analysis; Computer vision; Fuses; Iterative algorithms; Iterative methods; Measurement standards; Particle measurements; Uncertainty;
Conference_Titel :
Computer Vision and Pattern Recognition, 1996. Proceedings CVPR '96, 1996 IEEE Computer Society Conference on
Conference_Location :
San Francisco, CA
Print_ISBN :
0-8186-7259-5
DOI :
10.1109/CVPR.1996.517116
