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Level set based image segmentation with multiple regions

Level set based image segmentation with multiple regions. Mathematical Image Analysis Group, Faculty of Mathematics and Computer Science, Saarland University, Building 27, 66041 Saarbr¨ucken , Germany Thomas Brox and Joachim Weickert 報告 者:廖志浩 指導 老師:萬書言 副教授. Abstract Introduction

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Level set based image segmentation with multiple regions

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  1. Level set based image segmentation with multiple regions Mathematical Image Analysis Group, Faculty of Mathematics and Computer Science, Saarland University, Building 27, 66041 Saarbr¨ucken, Germany Thomas Brox and Joachim Weickert 報告者:廖志浩 指導老師:萬書言 副教授

  2. Abstract • Introduction • Two-region segmentation • Multiple region segmentation • Results

  3. Abstract • We address the difficulty of image segmentation methods based on thepopular level set framework to handle an arbitrary number of regions. • Based on avariationalmodel, we propose a minimisation strategy that robustly optimisestheenergy in a level set framework, including the number of regions.

  4. Introduction • As the minimisation of an energy functional that penalises deviations from smoothness within regions and the length of their boundaries • This formulation is closely related to the minimum description length criterion and the maximum a-posteriori criterion

  5. Introduction • The main problem of the level set representation lies in the fact that a level set function is restricted to the separation of two regions. As soon as more than two regions are considered, the level set idea looses parts of its attractiveness • The purpose of this paper is to solve the remaining problem of the level set framework while saving its advantages • We employ multi-scale ideas and a divide-and-conquer strategy

  6. Two-region segmentation • The probability of misclassified pixels with the probability densities p1 = p(x| ) and p2 = p(x| ) of the regions and , and under the side conditions and

  7. Two-region segmentation

  8. Two-region segmentation • The minimisation with respect to the regions can now be performed according to the gradient descent equation

  9. Multiple region segmentation • The general model is described by the energy of Zhu-Yuille

  10. Multiple region segmentation • So up to this point we can handle the following two cases: • A domain of the image can be split into two parts by the two-region segmentation framework. • A set of regions can evolve, minimising the energy in Eq. 5, if the number of regions is fixed and reasonable initialisations for the regions are available.

  11. Results

  12. Results

  13. Results

  14. Thanks for your attention

  15. Two-region segmentation • Firstly, the initialisation should be far from a possible segmentation of the image, as this enforces the search for a minimum in a more global scope. We always use an initialisation with many small rectangles scattered across the image domain. • The second measure is the application of a coarse-to-fine strategy. Starting with a downsampled image, there are less local minima, so the segmentation is more robust.

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