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2011 | 21 | 4 | 757-767

Tytuł artykułu

Partitioned iterated function systems with division and a fractal dependence graph in recognition of 2D shapes

Treść / Zawartość

Warianty tytułu

Języki publikacji

EN

Abstrakty

EN
One of the approaches in pattern recognition is the use of fractal geometry. The property of self-similarity of fractals has been used as a feature in several pattern recognition methods. All fractal recognition methods use global analysis of the shape. In this paper we present some drawbacks of these methods and propose fractal local analysis using partitioned iterated function systems with division. Moreover, we introduce a new fractal recognition method based on a dependence graph obtained from the partitioned iterated function system. The proposed method uses local analysis of the shape, which improves the recognition rate. The effectiveness of our method is shown on two test databases. The first one was created by the authors and the second one is the MPEG7 CE-Shape-1PartB database. The obtained results show that the proposed methodology has led to a significant improvement in the recognition rate.

Rocznik

Tom

21

Numer

4

Strony

757-767

Opis fizyczny

Daty

wydano
2011
otrzymano
2010-10-29
poprawiono
2011-04-17

Twórcy

  • Institute of Computer Science, University of Silesia, Będzińska 39, 41-200 Sosnowiec, Poland
  • Institute of Computer Science, University of Silesia, Będzińska 39, 41-200 Sosnowiec, Poland

Bibliografia

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  • Barnsley, M. (1988). Fractals Everywhere, Academic Press, Boston, MA.
  • Belongie, S., Malik, J. and Puzicha, J. (2002). Shape matching and object recognition using shape contexts, IEEE Transactions on Pattern Analysis and Machine Intelligence 24(4): 509-522.
  • Bruno, O.M., Plotze, R.d.O., Falvo, M. and Castro, M.d. (2008). Fractal dimension applied to plant identification, Information Science 178(12): 2722-2733.
  • Burger, W. and Burge, M.J. (2008). Digital Image Processing: An Algorithmic Introduction Using Java, Springer, New York, NY.
  • Chandran, S. and Kar, S. (2002). Retrieving faces by the PIFS fractal code, 6th IEEE Workshop on Applications of Computer Vision, Orlando, FL, USA, pp. 8-12.
  • Chang, Y.F., Lee, J.C., Mohd Rijal, O. and Syed Abu Bakar, S.A.R. (2010). Efficient online handwritten Chinese character recognition system using a two-dimensional functional relationship model, International Journal of Applied Mathematics and Computer Science 20(4): 727-738, DOI: 10.2478/v10006-010-0055-x.
  • Dey, P. (2005). Basic principles and applications of fractal geometry in pathology-A review, Analytical & Quantitative Cytology & Histology 27(5): 284-290.
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  • Erra, U. (2005). Toward real time fractal image compression using graphics hardware, in G. Bebis, R. Boyle, D. Koracin and B. Parvin (Eds.), Advances in Visual Computing, Lecture Notes in Computer Science, Vol. 3804, Springer, Heidelberg, pp. 723-728.
  • Felzenszwalb, P.F. and Schwartz, J. (2007). Hierarchical matching of deformable shapes, IEEE Conference on Computer Vision and Pattern Recognition, Minneapolis, MN, USA, Vol. 1, pp. 1-8.
  • Fisher, Y. (1995). Fractal Image Compression: Theory and Application, Springer-Verlag, New York, NY.
  • Gdawiec, K. (2009a). Fractal interpolation in modeling of 2D contours, International Journal of Pure and Applied Mathematics 50(3): 421-430.
  • Gdawiec, K. (2009b). Local Fractal Analysis in Recognition of 2D Shapes, Ph.D. thesis, University of Silesia, Sosnowiec, (in Polish).
  • Ghazel, M., Freeman, G.H. and Vrscay, E.R. (2003). Fractal image denoising, IEEE Transactions on Image Processing 12(12): 1560-1578.
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  • Harris, J.M., Hirst, J.L. and Mossinghoff, M.J. (2008). Combinatorics and Graph Theory, 2nd Edn., Springer, New York, NY.
  • Huang, K. and Yan, H. (2000). Signature verification using fractal transformation, 15th International Conference on Pattern Recognition, Barcelona, Spain, Vol. 2, pp. 855-858.
  • Kolumbán, J., Soós, A. and Varga, I. (2003). Self-similar random fractal measures using contraction method in probabilistic metric spaces, International Journal of Mathematics and Mathematical Sciences 2003(52): 3299-3313.
  • Kouzani, A.Z. (2008). Classification of face images using local iterated function systems, Machine Vision and Applications 19(4): 223-248.
  • Latecki, L.J., Lakamper, R. and Eckhardt, T. (2000). Shape descriptors for non-rigid shapes with a single closed contour, IEEE Conference on Computer Vision and Pattern Recognition, Hilton Head, SC, USA, Vol. 1, pp. 424-429.
  • Ling, H. and Jacobs, D.W. (2005). Using the inner-distance for classification of articulated shapes, IEEE Conference on Computer Vision and Pattern Recognition, San Diego, CA, USA, Vol. 2, pp. 719-726.
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  • Mandelbrot, B. (1983). The Fractal Geometry of Nature, W.H. Freeman and Company, New York, NY.
  • Meng, D., Cai, X., Su, Z. and Li, J. (2009). Photorealistic terrain generation method based on fractal geometry theory and procedural texture, 2nd IEEE International Conference on Computer Science and Information Technology, Beijing, China, pp. 341-344.
  • Mokhtarian, F. and Bober, M. (2003). Curvature Scale Space Representation: Theory, Applications, and MPEG-7 Standardization, Springer, Heidelberg.
  • Mozaffari, S., Faez, K. and Faradji, F. (2006). One dimensional fractal coder for online signature recognition, 18th International Conference on Pattern Recognition, Hong Kong, China, Vol. 2, pp. 857-860.
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  • Plotze, R.d.O., Falvo, M., Páuda, J.G., Bernacci, L.C., Vieira, M.L.C., Oliveira, G.C.X. and Bruno, O.M. (2005). Leaf shape analysis using the multiscale Minkowski fractal dimension, a new morphometric method: A study with passiflora (passifloraceae), Canadian Journal of Botany 83(3): 287-301.
  • Prusinkiewicz, P. and Lindenmayer, A. (1996). The Algorithmic Beauty of Plants, Springer-Verlag, New York, NY.
  • Skarbek, W. and Ignasiak, K. (1996). Asynchronous nonlinear fractal operators and their applications, Image Processing & Communications 2(2): 3-20.
  • Skarbek, W., Ignasiak, K. and Ghuwar, M. (1996). Fractal representation of planar shapes, in S. Miguet, A. Montanvert and S. Ubéda (Eds.), Discrete Geometry for Computer Imagery, Lecture Notes in Computer Science, Vol. 1176, Springer, Heidelberg, pp. 73-84.
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  • Xu, C., Liu, J. and Tang, X. (2009). 2D shape matching by contour flexibility, IEEE Transactions on Pattern Analysis and Machine Intelligence 31(1): 180-186.
  • Yokoyama, T., Sugawara, K. and Watanabe, T. (2004). Similarity-based image retrieval system using partitioned iterated function system codes, Artifical Life and Robotics 8(2): 118-122.
  • Zhao, G., Cui, L. and Li, H. (2007). Gait recognition using fractal scale, Pattern Analysis & Applications 10(3): 235-246.

Typ dokumentu

Bibliografia

Identyfikatory

Identyfikator YADDA

bwmeta1.element.bwnjournal-article-amcv21i4p757bwm
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