Minimum-Length Polygons in Approximation Sausages

The paper introduces a new approximation scheme for planar digital curves. This scheme defines an approximating sausage 'around' the given digital curve, and calculates a minimum-length polygon in this approximating sausage. The length of this polygon is taken as an estimator for the length of the curve being the (unknown) preimage of the given digital curve. Assuming finer and finer grid resolution it is shown that this estimator converges to the true perimeter of an r-compact polygonal convex bounded set. This theorem provides theoretical evidence for practical convergence of the proposed method towards a 'correct' estimation of the length of a curve. The validity of the scheme has been verified through experiments on various convex and non-convex curves. Experimental comparisons with two existing schemes have also been made.

[1]  Fridrich Sloboda,et al.  The minimum perimeter polygon and its application , 1992, Theoretical Foundations of Computer Vision.

[2]  Reinhard Klette,et al.  Length estimation of digital curves , 1999, Optics & Photonics.

[3]  Thomas Bülow,et al.  Rubber band algorithm for estimating the length of digitized space-curves , 2000, Proceedings 15th International Conference on Pattern Recognition. ICPR-2000.

[4]  Reinhard Klette,et al.  Determination of the Convex Hull of a Finite Set of Planar Points Within Linear Time , 1981, J. Inf. Process. Cybern..

[5]  AZRIEL ROSENFELD,et al.  Digital Straight Line Segments , 1974, IEEE Transactions on Computers.

[6]  Tetsuo Asano,et al.  A New Approximation Scheme for Digital Objects and Curve Length Estimations , 2000 .

[7]  Reinhard Klette,et al.  The Length of Digital Curves , 1999 .