Euclidean reconstruction from image sequences with varying and unknown focal length and principal point

Author

Heyden, Anders ; Åström, Kalle

Author_Institution

Dept. of Math., Lund Univ., Sweden

fYear

1997

fDate

17-19 Jun 1997

Firstpage

438

Lastpage

443

Abstract

The special case of reconstruction from image sequences taken by cameras with skew equal to 0 and aspect ratio equal to 1 has been treated. These type of cameras, here called cameras with Euclidean image planes, represent rigid projections where neither the principal point nor the focal length is known, it is shown that it is possible to reconstruct an unknown object from images taken by a camera with Euclidean image plane up to similarity transformations, i.e., Euclidean transformations plus changes in the global scale. An algorithm, using bundle adjustment techniques, has been implemented. The performance of the algorithm is shown on simulated data

Keywords

cameras; image reconstruction; image sequences; Euclidean image planes; Euclidean reconstruction; Euclidean transformations; algorithm performance; aspect ratio; bundle adjustment techniques; cameras; global scale; image sequences; rigid projections; similarity transformations; simulated data; skew; unknown focal length; unknown object reconstruction; unknown principal point; varying focal length; varying principal point; Biomedical imaging; Cameras; Councils; Image reconstruction; Image sequences; Nonlinear equations; X-ray imaging;

fLanguage

English

Publisher

ieee

Conference_Titel

Computer Vision and Pattern Recognition, 1997. Proceedings., 1997 IEEE Computer Society Conference on

Conference_Location

San Juan

ISSN

1063-6919

Print_ISBN

0-8186-7822-4

Type

conf

DOI

10.1109/CVPR.1997.609362

Filename

609362