DocumentCode
2173828
Title
Improved fast gauss transform and efficient kernel density estimation
Author
Yang, Changjiang ; Duraiswami, Ramani ; Gumerov, Nail A. ; Davis, Larry
Author_Institution
Perceptual Interfaces & Reality Lab., Maryland Univ., College Park, MD, USA
fYear
2003
fDate
13-16 Oct. 2003
Firstpage
664
Abstract
Evaluating sums of multivariate Gaussians is a common computational task in computer vision and pattern recognition, including in the general and powerful kernel density estimation technique. The quadratic computational complexity of the summation is a significant barrier to the scalability of this algorithm to practical applications. The fast Gauss transform (FGT) has successfully accelerated the kernel density estimation to linear running time for low-dimensional problems. Unfortunately, the cost of a direct extension of the FGT to higher-dimensional problems grows exponentially with dimension, making it impractical for dimensions above 3. We develop an improved fast Gauss transform to efficiently estimate sums of Gaussians in higher dimensions, where a new multivariate expansion scheme and an adaptive space subdivision technique dramatically improve the performance. The improved FGT has been applied to the mean shift algorithm achieving linear computational complexity. Experimental results demonstrate the efficiency and effectiveness of our algorithm.
Keywords
Gaussian processes; computational complexity; computer vision; estimation theory; adaptive space subdivision technique; computer vision; fast Gauss transform; kernel density estimation; mean shift algorithm; multivariate expansion scheme; pattern recognition; quadratic computational complexity; Application software; Bandwidth; Computational complexity; Computer vision; Density functional theory; Gaussian processes; Kernel; Nails; Parametric statistics; Pattern recognition;
fLanguage
English
Publisher
ieee
Conference_Titel
Computer Vision, 2003. Proceedings. Ninth IEEE International Conference on
Conference_Location
Nice, France
Print_ISBN
0-7695-1950-4
Type
conf
DOI
10.1109/ICCV.2003.1238383
Filename
1238383
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