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October 31, 2006Thesis Defense, UTK1/30 Variational and Partial Differential Equation Models for Color Image Denoising and Their Numerical Approximation.

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Presentation on theme: "October 31, 2006Thesis Defense, UTK1/30 Variational and Partial Differential Equation Models for Color Image Denoising and Their Numerical Approximation."— Presentation transcript:

1 October 31, 2006Thesis Defense, UTK1/30 Variational and Partial Differential Equation Models for Color Image Denoising and Their Numerical Approximation using Finite Element Methods Thesis Defense Miun Yoon

2 October 31, 2006Thesis Defense, UTK2/30 Digital Image Processing - Image restoration - Image compression -Image segmentation What is “Digital Image Processing”? observed image Stochastic modeling Wavelets Variational & PDE modeling output

3 October 31, 2006Thesis Defense, UTK3/30 What is an image in Mathematics? Pixel: Picture + Element observed image color image

4 October 31, 2006Thesis Defense, UTK4/30 Pixel Representations RGB Color Image :256 shades of RGB Gray Image :256 shades of gray- level

5 October 31, 2006Thesis Defense, UTK5/30 Image Denoising Model original image “unknown” additive noise noisy image

6 October 31, 2006Thesis Defense, UTK6/30 Gray Image Denoising Total Variational (TV) Model: Rudin, Osher, and Fatemi [Rud92](1992) Constrained minimization problem: Constraints noisy image Error level

7 October 31, 2006Thesis Defense, UTK7/30 Unconstrained minimization problem: Gradient Flow (TV Flow):

8 October 31, 2006Thesis Defense, UTK8/30 Regularized Problem Previous Studies - A. Chamnbolle and P. –L. Lions [Cha97]: proved the existence and the uniqueness result for constraint minimization problem and unconstraint minimization problem is equivalent to the constraint minimization for a unique and non-negative - X. Feng and A. Prohl [Fen03]: proved the existence and the uniqueness for the TV flow and regularized problem and an error analysis for the fully discrete finite approximation for the regularized problem

9 October 31, 2006Thesis Defense, UTK9/30 Weak Formulation

10 October 31, 2006Thesis Defense, UTK10/30 Semi-Discrete Finite Element Method T h = {K 1,…,K mR } Finite-Dimensional subspace : set of all vertices of the triangulation T h uniquely determined & forms a basis for V h

11 October 31, 2006Thesis Defense, UTK11/30 Semi-Discrete Finite Element Method Non-linear ODE system in  t 

12 October 31, 2006Thesis Defense, UTK12/30 Fully Discrete Finite Element Method X. Feng, M. von Oehen and A. Prohl [Fen05]: rate of convergence for the fully discrete finite approximation of the regularized problem

13 October 31, 2006Thesis Defense, UTK13/30 Numerical Tests I t=0 t=5e-5 t=1e-4t=1.5e-4 t=2e-4

14 October 31, 2006Thesis Defense, UTK14/30 Numerical Tests II t=0 t=5e-5 t=1e-4t=1.5e-4 t=2e-4

15 October 31, 2006Thesis Defense, UTK15/30 Numerical Tests III t=0 t=5e-5 t=1e-4t=1.5e-4 t=2e-4

16 October 31, 2006Thesis Defense, UTK16/30 Color Image Denoising brightness chromaticity color vector TV flow P-harmonic map flow Non-flat feature channel by channel model chromaticity & brightness (CB) Model

17 October 31, 2006Thesis Defense, UTK17/30 p-harmonic Map Minimizer of E p Euler-Lagrange equation unit sphere p-energy Constrained Minimization Problem constraint p-harmonic map

18 October 31, 2006Thesis Defense, UTK18/30 p-harmonic Color Image Denoising Model Gradient flow Non-linear Non-convex Non-linear

19 October 31, 2006Thesis Defense, UTK19/30 Regularization of p-energy nonlinearnonconvex

20 October 31, 2006Thesis Defense, UTK20/30 Regularized Model p-harmonic map heat flow

21 October 31, 2006Thesis Defense, UTK21/30 Weak Formulation

22 October 31, 2006Thesis Defense, UTK22/30 Semi-Discrete Finite Element Method : set of all vertices of the triangulation T h Finite-Dimensional subspace T h = {K 1,…,K mR }

23 October 31, 2006Thesis Defense, UTK23/30 Semi-Discrete Finite Element Method Non-linear ODE system in  t 

24 October 31, 2006Thesis Defense, UTK24/30 Semi-Discrete Finite Element Method

25 October 31, 2006Thesis Defense, UTK25/30 Fully-Discrete Finite Element Method Decomposition of the density function

26 October 31, 2006Thesis Defense, UTK26/30 Numerical Tests t=0t=2e-4 t=5e-4t=7e-4t=1e-3

27 October 31, 2006Thesis Defense, UTK27/30 Generalization Generalized model of the p-harmonic map Regularized flow of generalized model

28 October 31, 2006Thesis Defense, UTK28/30 Numerical Tests I and q=1 t=2e-4 t=5e-4 t=7e-4 t=1e-3

29 October 31, 2006Thesis Defense, UTK29/30 Numerical Tests II and q=1 t=2e-4 t=5e-4 t=7e-4 t=1e-3

30 October 31, 2006Thesis Defense, UTK30/30 Numerical Tests III channel-by-channel t=1e-4 t=3e-4 t=5e-4 t=1e-3

31 31 Appendix

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