Digital Image Processing and Analysis — PDEs and Variational Tools

1. L. Alvarez, Y. Gousseau and J.M. Morel, Scales in Natural Images and a Consequence On their Bounded Variation Norm, in Scale Space’ 99. Ed. M. Nielsen, P. Johansen, O. Olsen and J. Weickert, pp. 247–258 Lectures Notes in Computer Science N^o 1682, Springer Verlag, 2000

   Google Scholar 

2. L. Ambrosio, A Compactness Theorem for a new Class of Functions of Bounded Variation, Boll. Un. Mat. Ital. B (7), Vol. 3, pp. 857–881, 1989

   MATH  Google Scholar 

3. T.F. Chan and J. Shen, Image Processing and Analysis, SIAM, 2005

   Google Scholar 

4. M.G. Crandall, H. Ishii and P.L. Lions, User’s guide to viscosity solutions of second order Partial differential equations, Bull. Amer. Soc. 27, pp. 1–67, 1992

   MATH  Google Scholar 

5. E. Fatemi, L.I. Rudin, and S. Osher, Nonlinear total variation based noise removal algorithms, Physica D 60, No. 1–4, 259–268. [ISSN0167-2789], 1992

   MATH  Google Scholar 

6. F. Guichard and J.-M. Morel, Image Analysis and P.D.E.s ¹¹

   Google Scholar 

7. J. Malik and P. Perona, Scale Space and Edge Detection using Anisotropic Diffusion, IEEE Trans. Patt. Anal. Mach. Intell., Vol. 12, pp. 629–639, 1990

   Article  Google Scholar 

8. D. Mumford and J. Shah, Optimal Approximations by Piecewise Smooth Functions and associated Variational Problems, Comm. Pure Appl. Math., Vol. 42, pp. 577–685, 1989

   Article  MATH  Google Scholar 

9. S. Osher and L.I. Rudin, Total Variation based Image Restoration with free local Constraints, in Proc. 1st IEEE ICIP, Vol. 1, pp. 31–35, 1994

   Google Scholar 

Download references