We introduce an image contour clustering method based on a multiscale image representation and its application to image compression. Multiscale gradient planes are obtained from the mean squared sum of 2D wavelet transform of an image. The decay on the multiscale gradient planes across scales depends on the Lipshitz exponent. Since the Lipshitz exponent indicates the spatial differentiability of an image, the multiscale gradient planes represent smoothness or sharpness around edges on image contours. We apply vector quatization to the multiscale gradient planes at contours, and cluster the contours in terms of represntative vectors in VQ. Since the multiscale gradient planes indicate the Lipshitz exponents, the image contours are clustered according to its gradients and Lipshitz exponents. Moreover, we present an image recovery algorithm to the multiscale gradient planes, and we achieve the skech-based image compression by the vector quantization on the multiscale gradient planes.
雑誌名
IEICE transactions on fundamentals of electronics, communications and computer sciences
巻
E81-A
号
8
ページ
1652 - 1660
発行年
1998-08
出版者
The Institute of Electronics, Information and Communication Engineers
Image Contour Clustering by Vector Quantization on Multiscale Gradient Planes and Its Application to Image Coding
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