Research Article Open Access

A New Modified Gaussian Mixture Model for Color-Texture Segmentation

M. Sujaritha and S. Annadurai

Abstract

Problem statement: This study presents a new, simple and efficient modified Gaussian mixture model based clustering algorithm for color-texture segmentation. The proposed mixture model introduces a new component density function which incorporates spatial information and the weighting factor for neighborhood effect is fully adaptive to the image content. Approach: It enhances the smoothness towards piecewise-homogeneous segmentation and reduces the edge-blurring effect. An Expectation Maximization (EM) model fitting Maximum A Posteriori (MAP) algorithm segments the image by utilizing the pixel’s color and texture features and the captured neighborhood relationships among them. Results: The algorithm simultaneously calculates the model parameters and segments the pixels iteratively in an interleaved manner. Finally, it converges to a solution where the model parameters and pixel labels are stabilized within a specified criterion. Conclusion:The experimental results with synthetic and natural images demonstrate that the proposed method is effective in improving the segmentation and it outperforms the Fusion of Clustering Results (FCR) algorithm, which is the recent popular segmentation approach.

Journal of Computer Science
Volume 7 No. 2, 2011, 279-283

DOI: https://doi.org/10.3844/jcssp.2011.279.283

Submitted On: 13 January 2011 Published On: 25 February 2011

How to Cite: Sujaritha, M. & Annadurai, S. (2011). A New Modified Gaussian Mixture Model for Color-Texture Segmentation. Journal of Computer Science, 7(2), 279-283. https://doi.org/10.3844/jcssp.2011.279.283

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Keywords

  • Gaussian mixture model
  • Expectation Maximization (EM)
  • Bayesian pixel classification
  • color texture segmentation
  • MAP estimation
  • EM algorithm
  • Maximum A Posteriori (MAP)
  • Spatially Variant Finite Mixture Model (SVFMM)
  • Markov Random Field (MRF)
  • Probabilistic Rand Index (PRI)
  • Boundary Displacement Errors (BDE)
  • Variation of Information (VoI)