Factorized Graph Matching - Robotics Institute Carnegie Mellon University

Factorized Graph Matching

Conference Paper, Proceedings of (CVPR) Computer Vision and Pattern Recognition, pp. 127 - 134, June, 2012

Abstract

Graph matching plays a central role in solving correspondence problems in computer vision. Graph matching problems that incorporate pair-wise constraints can be cast as a quadratic assignment problem (QAP). Unfortunately, QAP is NP-hard and many algorithms have been proposed to solve different relaxations. This paper presents factorized graph matching (FGM), a novel framework for interpreting and optimizing graph matching problems. In this work we show that the affinity matrix can be factorized as a Kronecker product of smaller matrices. There are three main benefits of using this factorization in graph matching: (1) There is no need to compute the costly (in space and time) pair-wise affinity matrix; (2) The factorization provides a taxonomy for graph matching and reveals the connection among several methods; (3) Using the factorization we derive a new approximation of the original problem that improves state-of-the-art algorithms in graph matching. Experimental results in synthetic and real databases illustrate the benefits of FGM.

BibTeX

@conference{Zhou-2012-7501,
author = {Feng Zhou and Fernando De la Torre Frade},
title = {Factorized Graph Matching},
booktitle = {Proceedings of (CVPR) Computer Vision and Pattern Recognition},
year = {2012},
month = {June},
pages = {127 - 134},
}