Share Email Print

Proceedings Paper

Iterative procedure for camera parameters estimation using extrinsic matrix decomposition
Author(s): Yegor V. Goshin; Vladimir A. Fursov
Format Member Price Non-Member Price
PDF $14.40 $18.00
cover GOOD NEWS! Your organization subscribes to the SPIE Digital Library. You may be able to download this paper for free. Check Access

Paper Abstract

This paper addresses the problem of 3D scene reconstruction in cases when the extrinsic parameters (rotation and translation) of the camera are unknown. This problem is both important and urgent because the accuracy of the camera parameters significantly influences the resulting 3D model. A common approach is to determine the fundamental matrix from corresponding points on two views of a scene and then to use singular value decomposition for camera projection matrix estimation. However, this common approach is very sensitive to fundamental matrix errors. In this paper we propose a novel approach in which camera parameters are determined directly from the equations of the projective transformation by using corresponding points on the views. The proposed decomposition allows us to use an iterative procedure for determining the parameters of the camera. This procedure is implemented in two steps: the translation determination and the rotation determination. The experimental results of the camera parameters estimation and 3D scene reconstruction demonstrate the reliability of the proposed approach.

Paper Details

Date Published: 26 March 2016
PDF: 10 pages
Proc. SPIE 9807, Optical Technologies for Telecommunications 2015, 980713 (26 March 2016); doi: 10.1117/12.2234789
Show Author Affiliations
Yegor V. Goshin, Image Processing Systems Institute (Russian Federation)
Samara State Aerospace Univ. (Russian Federation)
Vladimir A. Fursov, Image Processing Systems Institute (Russian Federation)
Samara State Aerospace Univ. (Russian Federation)

Published in SPIE Proceedings Vol. 9807:
Optical Technologies for Telecommunications 2015
Vladimir A. Andreev; Anton V. Bourdine; Vladimir A. Burdin; Oleg G. Morozov; Albert H. Sultanov, Editor(s)

© SPIE. Terms of Use
Back to Top