Approaches for Retinex and Their Relations

1. Approaches for Retinex and Their Relations Yu Du March 14, 2002

2. Presentation Outline • Introductions to retinex • Approaches for retinex • The variational framework • Relation of these approaches • Conclusions

3. What Is Retinex • Lightness and retinex theory • E. H. Land 1971 • Visual system of human • Retina: the sensory membrane lining the eye that receives the image formed by the lens (Webster) • Reflectance and illumination • Edges and independent color senstion

4. Model of retinex (1) The given image The illumination part The reflectance part

5. Model of retinex (2) + Log Exp Input Image Estimate the Illumination

6. Three Types of Previous Approaches • Random walk algorithms • E. H. Land (1971) • Homomorphic filtering • E. H. Land (1986), D. J. Jobson (1997) • Solving Poisson equation • B. K. P. Horn (1974)

7. Random Walk Algorithms (1) • First retinex algorithm • A series of random paths • Starting pixel • Randomly select a neighbor pixel as next pixel on path • Accumulator and counter

8. Random Walk Algorithms (2) • Adequate number of random paths • Cover the whole image • Small variance • Length of paths • >200 for 10x10 image (D. H. Brainard)

9. Special Smoothness of Random Walk • The value in the accumulator • The illumination part

10. Homomorphic Filtering • Assume illumination part to be smooth • Apply low pass filter

11. Poisson Equation Solution (1) • Derivative of illumination part close to zero • Reflectance part to be piece-wise constant • Get the illumination part • Take the derivative of the image • Clip out the high derivative peaks

12. Poisson Equation Solution (2) • Solve Poisson equation • Iterative method • Apply low-pass filter (invert Laplacian operator)

13. Comments on Above Approaches • Random walk algorithm • Too slow • Homomorphic filtering • Low-pass filtering first or log first? • More work needed to be done on Poisson equation solving

14. Variational Framework • Presented by R. Kimmel etc. • From assumptions to penalty function • From penalty function to algorithm

15. Assumptions On Illumination Image • Spatial smoothness of illumination • Reflectance is not pure white • Illumination close to intensity image • Spatial smoothness of reflectance • Continues smoothly beyond boundaries

16. Penalty Function and Restrictions • Goal to minimize: • Subject to: And on

17. Solve the Penalty Function (1) • Euler-Lagrange equations And

18. Solve the Penalty Function (2) • Projected normalized steepest descent (PNSD) • Iteratively to get illumination part

19. Multi-resolution • Make PNSD algorithm converges faster • Illumination part is smooth • Coarse resolution image first • Upscale coarse illumination as initial of finer resolution layer • Not multi-scale technique

20. Relationship of Different Approaches (1) • Random walk and Homomorphic filtering • R. Kimmel’s words on Homomorphic filtering and remove constraint

21. Relationship of Different Approaches (2) • Apply appropriate scaling on images, Homomorphic filtering satisfies constrain and • Poisson equation approach:

22. Conclusions • Retinex is trying to simulate human vision process • Different approaches are from same assumptions • Implementation details are important for results

23. Thank You March 14, 2002