DocumentCode
2817097
Title
RANSAC-LEL: An optimized version with least entropy like estimators
Author
Distante, Cosimo ; Indiveri, Giovanni
Author_Institution
Ist. Naz. di Ottica, CNR, Arnesano, Italy
fYear
2011
fDate
11-14 Sept. 2011
Firstpage
1425
Lastpage
1428
Abstract
The paper proposes a robust estimation method which implements, in cascade, two algorithms: (i) a Random Sample and Consensus (RANSAC) algorithm and (ii) a novel nonlinear prediction error estimator minimizing a cost function inspired by the mathematical definition of Gibbs entropy. The minimization of the nonlinear cost function allows to refine the Consensus Set found with standard RANSAC in order to reach optimal estimates of geometric transformation parameters under image stitching context. The method has been experimentally tested and compared with a standard RANSAC-MSAC algorithm where noticeable improvements are recorded in terms of computational complexity and quality of the stitching process, namely of the mean squared symmetric re-projection error.
Keywords
computational complexity; entropy; image matching; prediction theory; random processes; Gibbs entropy; RANSAC-LEL; RANSAC-MSAC algorithm; computational complexity; geometric transformation parameter; image matching; image stitching; least entropy like estimator; mean squared symmetric reprojection error; nonlinear cost function; nonlinear prediction error estimator; random sample and consensus; robust estimation method; stitching process; Computational modeling; Conferences; Cost function; Entropy; Estimation; Kernel; Robustness; Homography Estimation; Image matching; RANSAC-LEL;
fLanguage
English
Publisher
ieee
Conference_Titel
Image Processing (ICIP), 2011 18th IEEE International Conference on
Conference_Location
Brussels
ISSN
1522-4880
Print_ISBN
978-1-4577-1304-0
Electronic_ISBN
1522-4880
Type
conf
DOI
10.1109/ICIP.2011.6115709
Filename
6115709
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