The curvature scale-space image of a planar curve is computed by convolving a path-based parametric representation of the curve with a Gaussian function of variance sigma /sup 2/, extracting the zeros of curvature of the convolved curves and combining them in a scale space representation of the curve. For any given curve Gamma , the process of generating the ordered sequence of curves ( Gamma /sub sigma / mod sigma >or=0) is the evolution of Gamma . It is shown that the normalized arc length parameter of a curve is, in general, not the normalized arch length parameter of a convolved version of that curve. A novel method of computing the curvature scale space image reparametrizes each convolved curve by its normalized arc length parameter. Zeros of curvature are then expressed in that new parametrization. The result is the renormalized curvature scale-space image and is more suitable for matching curves similar in shape. Scaling properties of planar curves and the curvature scale space image are also investigated. It is shown that no new curvature zero-crossings are created at the higher scales of the curvature scale space image of a planar curve in C/sub 1/ if the curve remains in C/sub 1/ during evolution. Several results are presented on the preservation of various properties of planar curves under the evolution process.<<ETX>>
[1]
Benjamin B. Kimia,et al.
Deblurring Gaussian blur
,
2015,
Comput. Vis. Graph. Image Process..
[2]
Berthold K. P. Horn,et al.
Filtering Closed Curves
,
1986,
IEEE Transactions on Pattern Analysis and Machine Intelligence.
[3]
Farzin Mokhtarian,et al.
Scale-Based Description and Recognition of Planar Curves and Two-Dimensional Shapes
,
1986,
IEEE Transactions on Pattern Analysis and Machine Intelligence.
[4]
Alan L. Yuille,et al.
Scaling Theorems for Zero Crossings
,
1987,
IEEE Transactions on Pattern Analysis and Machine Intelligence.
[5]
Andrew P. Witkin,et al.
Uniqueness of the Gaussian Kernel for Scale-Space Filtering
,
1986,
IEEE Transactions on Pattern Analysis and Machine Intelligence.
[6]
Michael Brady,et al.
The Curvature Primal Sketch
,
1986,
IEEE Transactions on Pattern Analysis and Machine Intelligence.
[7]
M. Gage,et al.
The heat equation shrinking convex plane curves
,
1986
.