The Generalized Laplacian Distance and Its Applications for Visual Matching

Author

Elboer, Elhanan ; Werman, Michael ; Hel-Or, Yacov

Author_Institution

Sch. of Comput. Sci., Hebrew Univ. of Jerusalem, Jerusalem, Israel

fYear

2013

fDate

23-28 June 2013

Firstpage

2315

Lastpage

2322

Abstract

The graph Laplacian operator, which originated in spectral graph theory, is commonly used for learning applications such as spectral clustering and embedding. In this paper we explore the Laplacian distance, a distance function related to the graph Laplacian, and use it for visual search. We show that previous techniques such as Matching by Tone Mapping (MTM) are particular cases of the Laplacian distance. Generalizing the Laplacian distance results in distance measures which are tolerant to various visual distortions. A novel algorithm based on linear decomposition makes it possible to compute these generalized distances efficiently. The proposed approach is demonstrated for tone mapping invariant, outlier robust and multimodal template matching.

Keywords

graph theory; image matching; learning (artificial intelligence); pattern clustering; MTM; distance function; distance measures; embedding; generalized Laplacian distance; graph Laplacian operator; learning applications; linear decomposition; matching by tone mapping; multimodal template matching; outlier robust; spectral clustering; spectral graph theory; tone mapping invariant; visual distortions; visual matching; visual search; Approximation methods; Correlation; Discrete cosine transforms; Equations; Laplace equations; Robustness; Vectors; graph Laplacian; template matching;

fLanguage

English

Publisher

ieee

Conference_Titel

Computer Vision and Pattern Recognition (CVPR), 2013 IEEE Conference on

Conference_Location

Portland, OR

ISSN

1063-6919

Type

conf

DOI

10.1109/CVPR.2013.300

Filename

6619144