Title :
Local reproducible smoothing without shrinkage
Author_Institution :
Dept. of Comput. Sci., Massachusetts Univ., Amherst, MA, USA
Abstract :
A simple local smoothing filter for curves or surfaces, combining the advantages of Gaussian smoothing and Fourier curve description, is defined. Unlike Gaussian filters, the filter described has no shrinkage problem. Repeated application of the filter does not yield a curve or surface smaller than the original, but simply reproduces the approximate result that would have been obtained by a single application at the largest scale. Unlike Fourier description, the filter is local in space. The wavelet transform of Y. Meyer (1989) is shown to have these properties
Keywords :
digital filters; filtering and prediction theory; image processing; Fourier curve description; Gaussian smoothing; local smoothing filter; reproducible smoothing; shrinkage; Application software; Computer science; Contracts; Filtering; Frequency; Image converters; Nonlinear filters; Smoothing methods; Wavelet transforms; Welding;
Conference_Titel :
Computer Vision and Pattern Recognition, 1992. Proceedings CVPR '92., 1992 IEEE Computer Society Conference on
Conference_Location :
Champaign, IL
Print_ISBN :
0-8186-2855-3
DOI :
10.1109/CVPR.1992.223263
