Title :
Reconstruction of Euclidean planes from voxels
Author_Institution :
Sch. of Sci. & Technol., Chiba Univ., Japan
Abstract :
We aim to formulate the recognition of a planes from a discrete point set as a nonlinear optimization problem, and we prove a uniqueness theorem for the solution of this problem. We deal with the supercover model in a space for the expression of discrete planes. The algorithm achieves invertible data compression of digital objects, since the algorithm transforms a collection voxels to a collection of plane parameters, which classify the voxels.
Keywords :
image recognition; image reconstruction; image resolution; nonlinear programming; object recognition; Euclidean planes; data compression; digital object voxels; discrete point set; image reconstruction; nonlinear optimization problem; polyhedrization algorithm; Character recognition; Data compression; Data processing; Data visualization; Discrete transforms; Geometry; Hypercubes; Linear programming; Noise robustness; Object detection;
Conference_Titel :
3D Data Processing, Visualization and Transmission, 2004. 3DPVT 2004. Proceedings. 2nd International Symposium on
Print_ISBN :
0-7695-2223-8
DOI :
10.1109/TDPVT.2004.1335395
