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Issue:Fuzzy hit-or-miss transform by intuitionistic fuzzy structuring elements

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Title of paper: Fuzzy hit-or-miss transform by intuitionistic fuzzy structuring elements
Author(s):
Antony T. Popov
Faculty of Mathematics and Informatics, St. Kliment Ohridski University of Sofia
Published in: "Notes on Intuitionistic Fuzzy Sets", Volume 6 (2000) Number 2, pages 52—60
Download:  PDF (6645  Kb, File info)
Abstract: This paper shows that intuitionistic fuzzy sets (IFS) can be used efficiently as structuring elements in fuzzy hit-or-miss transform to find objects with a given (or close to a given) shape on digital images. Thus IFS are found to be useful in document processing, X-ray and MR tomography etc.
Keywords: complete lattice, fuzzy set, IFS, morphological operations, hit-or-miss transform
References:
  1. Gargov, G and K. Atanassov, On the intuitionistic fuzzy logic operations, Notes on IFS, Vol. 1, No. 1, pp. 1-4, 1995.
  2. Grigorishin, T., G. Abdel-Hamid, Yee-Hong Yang, Skeletonization: An electrostatic field-based approach, manuscript, 1996.
  3. Haralick, R.M. and L. G. Shapiro, Computer and robot vision, volume 1. Addison-Wesley, 1992.
  4. Heijmans, H., Morphological Image Operators, Academic Press, Boston, MA, 1994.
  5. Bloch, I. and H. Maitre, Fuzzy mathematical morphologies: A comparative study, Pattern Recognition, Vol. 28(9), pp. 1341-1387, 1995.
  6. A. T. Popov, Fuzzy convexity and mathematical morphology, SPIE Proceedings Series vol. 2578 — Vision Geometry IV, pp. 45 — 51, 1995.
  7. A. T. Popov, Approximations of set skeletons. SPIE Proceedings vol. 3454 — Vision Geometry VII, pp. 184 — 191, 1998.
  8. J. Serra, Image analysis and mathematical morphology. Academic Press, London, 1982.
  9. D. Sinha and E. R. Dougherty, Fuzzification of Set Inclusion, Theory and Applications. Fuzzy Sets and Systems, Vol. 55, pp. 15-42, 1993.
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