Edge Focusing Based on Multiscales Wavelet Transform

ZHAO Xi-an; LI De-ren

doi:10.11834/jrs.20030411

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Edge Focusing Based on Multiscales Wavelet Transform
Issue 4, Pages: 299-303(2003)
Published：2003
DOI： 10.11834/jrs.20030411
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[1]赵西安,李德仁.小波多尺度影像边缘聚焦算法[J].遥感学报,2003(04):299-303. DOI： 10.11834/jrs.20030411.

ZHAO Xi-an, LI De-ren. Edge Focusing Based on Multiscales Wavelet Transform[J]. Journal of Remote Sensing, 2003, (4): 299-303. DOI： 10.11834/jrs.20030411.

摘要

讨论了基于光滑函数的二维小波极大模边缘算子和小波过零点边缘算子及其特性。提出了多尺度二进小波变换过零点边缘聚焦算法。通过对不同尺度下小波变换的遥感影像进行复合、边缘提取和聚焦后结果进行比较

可以发现该算法适应影像空间尺度不确定性目标边缘提取。既可保证大尺度下的轮廓信息不失真

又能在边缘定位上保持很高的精度。

Abstract

The zero-crossings and the maximum of the wavelet transform are very effective for locating the edges of the image function. In this paper

we investigate the properties of the zero crossing and the maximum related the wavelet transform which are derived from the first derivative or the second derivative of the smooth function respectively. Multiscale wavelet transform provides a pyramid hierarchic descriptive method of image features. Its main advantages are that both the algorithms involved do not create false generic features and the difference of edges derived from two near scale wavelet transforms is not larger than one pixel. Mallat discrete dyadic wavelet transform has the advantages. In multiscale wavelet transform

if a scale is bigger

the edge contour of image will be derived and the detail information be blurred or lost. If the scale is smaller

the details in image can be detected

in the same time

finer noise in image will be also kept. The object scale changes in remote sensing image occur over a wide range and vary unpredictably over the image. It is difficult to select an adaptive scale before or in the wavelet transform. Inspired by the scale-space theorem and wide and unpredictable scale changes in remote sensing image as mentioned above

and based on zero crossings of 2D multiscale wavelet transform

the arithmetic of focusing edge in dyadic wavelet transform is introduced as follows. 1) The image function f（x

y）is transformed by 2D Gaussian symmetric wavelet at dyadic scales

and subsets {W 2jf（x

y）

0≤j≤n} related the transform are stored. The edge features in subimage W 2nf（x

y）（at scale j=n） are detected by zero-crossings of Gaussian symmetric wavelet transform and the map related to the edge features is derived and stored. 2) A special region around the edge related to W 2jf（x

y）（j≤n） is selected as a searching area. The edge features in subimage W 2 j-1f（x

y） are detected by zero-crossings of the same transform around searching area and a new edge map is derived. The former edge map is updated by the new edge map. 3) j=j-1

if j=0 stop

else go to step 2. Experiments show that the arithmetic is effective to solve the problem

in which the object scale in image function is uncertain. The method is not only to eliminate fine scale noise and locate edge accurately

but also to extract edge contour correctly at larger scale.

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