Title :
Data Fusion and Multicue Data Matching by Diffusion Maps
Author :
Lafon, S. ; Keller, Y. ; Coifman, R.R.
Author_Institution :
Google Inc., Mountain View, CA
Abstract :
Data fusion and multicue data matching are fundamental tasks of high-dimensional data analysis. In this paper, we apply the recently introduced diffusion framework to address these tasks. Our contribution is three-fold: first, we present the Laplace-Beltrami approach for computing density invariant embeddings which are essential for integrating different sources of data. Second, we describe a refinement of the Nystrom extension algorithm called "geometric harmonics." We also explain how to use this tool for data assimilation. Finally, we introduce a multicue data matching scheme based on nonlinear spectral graphs alignment. The effectiveness of the presented schemes is validated by applying it to the problems of lipreading and image sequence alignment
Keywords :
data mining; graph theory; learning (artificial intelligence); sensor fusion; Laplace-Beltrami approach; data assimilation; data fusion; diffusion maps; geometric harmonics; multicue data matching; Data analysis; Data assimilation; Embedded computing; Geometry; Graph theory; Image sequences; Machine learning; Machine learning algorithms; Markov processes; Pixel; Markov processes; Pattern matching; data mining; graph algorithms; graph theory; image databases.; machine learning; Algorithms; Artificial Intelligence; Cluster Analysis; Databases, Factual; Image Enhancement; Image Interpretation, Computer-Assisted; Information Storage and Retrieval; Pattern Recognition, Automated; Subtraction Technique;
Journal_Title :
Pattern Analysis and Machine Intelligence, IEEE Transactions on
DOI :
10.1109/TPAMI.2006.223
