Application of Hurwitz-Radon Matrices in Shape Coefficients

Authors

  • Dariusz Jakóbczak Technical University of Koszalin

Keywords:

shape coefficients, curve interpolation, contour reconstruction, length estimation, area estimation, Hurwitz-Radon matrices

Abstract

Computer vision needs suitable methods of shape representation and contour reconstruction. Method of Hurwitz-Radon Matrices (MHR), invented and described by the author, is applied in reconstruction and interpolation of curves in the plane. Reconstructed curves represent the shape and contour of the object. Any point of the contour can be calculated by MHR method and then parameters of the object, used in shape coefficients, are computed: length of the contour, area of the object, Feret’s diameters. Proposed method is based on a family of Hurwitz-Radon (HR) matrices. The matrices are skew-symmetric and possess columns composed of orthogonal vectors. The operator of Hurwitz-Radon (OHR), built from these matrices, is described. The shape is represented by the set of nodes. It is shown how to create the orthogonal and discrete OHR and how to use it in a process of shape representation and reconstruction. MHR method is interpolating the curve point by point without using any formula or function.

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Published

2013-06-13

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Section

Articles

How to Cite

Application of Hurwitz-Radon Matrices in Shape Coefficients. (2013). Asian Journal of Fuzzy and Applied Mathematics, 1(1). https://ajouronline.com/index.php/AJFAM/article/view/32

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