Paper Info
Title
Using Geometric Interval Algebra Modeling for Improved Three-Dimensional Camera Calibration
Abstract
This paper addresses the problem of estimating camera calibration parameters by using a novel method based on interval algebra. Unlike existing solutions, which usually apply real algebra, our method is capable of obtaining highly accurate parameters even in scenarios where the input data for camera calibration are severely corrupted by noise or no artificial calibration target can be introduced on the scene. We introduce some key concepts regarding the usage of interval algebra on projective space, which might be used by other computer vision methods. To demonstrate the robustness and effectiveness of our method, we present results for camera calibration with varying levels of noise on the input data of a world coordinate frame (standard deviation of up to 0.5 m) and their corresponding projections onto an image plane (standard deviation of up to 10 pixels), which are significantly larger than noise levels considered by state-of-the-art methods.
Year
DOI
Venue
2019
10.1007/s10851-019-00907-x
Journal of Mathematical Imaging and Vision
Keywords
Field
DocType
Interval algebra, Image geometry, Camera calibration, Projective geometry
Computer vision,Projective geometry,Image plane,Robustness (computer science),Camera resectioning,Artificial intelligence,Pixel,Standard deviation,Mathematics,Calibration,Projective space
Journal
Volume
Issue
ISSN
61
9
1573-7683
Citations 
PageRank 
References 
0
0.34
0
Authors
3
Name
Order
Citations
PageRank
Darlan N. Brito100.34
Flávio L. C. Pádua210210.88
Aldo P. C. Lopes300.34