Title :
Wasserstein regularization of imaging problem
Author :
Rabin, Julien ; Peyré, Gabriel
Author_Institution :
CMLA, ENS de Cachan, Cachan, France
Abstract :
This paper introduces a novel and generic framework embedding statistical constraints for variational problems. We resort to the theory of Monge-Kantorovich optimal mass transport to define penalty terms depending on statistics from images. To cope with the computation time issue of the corresponding Wasserstein distances involved in this approach, we propose an approximate variational formulation for statistics represented as point clouds. We illustrate this framework on the problem of regularized color specification. This is achieved by combining the proposed approximate Wasserstein constraint on color statistics with a generic geometric-based regularization term in a unified variational minimization problem. We believe that this methodology may lead to some other interesting applications in image processing, such as medical imaging modification, texture synthesis, etc.
Keywords :
image colour analysis; statistical analysis; variational techniques; Monge-Kantorovich optimal mass transport; Wasserstein regularization; color statistics; geometric-based regularization term; image processing; imaging problem; medical imaging modification; point clouds; regularized color specification; statistical constraints; texture synthesis; variational formulation; variational minimization problem; variational problems; Colored noise; Conferences; Histograms; Image color analysis; Imaging; Minimization; Energy minimization; Gradient descent; Image regularization; Variational model; color and contrast modification;
Conference_Titel :
Image Processing (ICIP), 2011 18th IEEE International Conference on
Conference_Location :
Brussels
Print_ISBN :
978-1-4577-1304-0
Electronic_ISBN :
1522-4880
DOI :
10.1109/ICIP.2011.6115740
