Title :
Multiscale segmentation with vector-valued nonlinear diffusions on arbitrary graphs
Author :
Dong, Xiaogang ; Pollak, Ilya
Author_Institution :
Sch. of Electr. & Comput. Eng., Purdue Univ., West Lafayette, IN, USA
fDate :
7/1/2006 12:00:00 AM
Abstract :
We propose a novel family of nonlinear diffusion equations and apply it to the problem of segmentation of multivalued images. We show that this family can be viewed as an extension of stabilized inverse diffusion equations (SIDEs) which were proposed for restoration, enhancement, and segmentation of scalar-valued signals and images in . Our new diffusion equations can process vector-valued images defined on arbitrary graphs which makes them well suited for segmentation. In addition, we introduce novel ways of utilizing the shape information during the diffusion process. We demonstrate the effectiveness of our methods on a large number of segmentation tasks.
Keywords :
graph theory; image segmentation; nonlinear equations; arbitrary graphs; multiscale segmentation; multivalued image segmentation; nonlinear diffusion equations; scalar-valued signals; shape information; stabilized inverse diffusion equations; vector-valued image processing; vector-valued nonlinear diffusions; Diffusion processes; Filtering; Gaussian noise; Gaussian processes; Image edge detection; Image restoration; Image segmentation; Nonlinear equations; Shape; Signal restoration; Nonlinear diffusions; scale-space; segmentation; stabilized inverse diffusion equations (SIDEs); texture; Algorithms; Artificial Intelligence; Computer Simulation; Diffusion; Image Enhancement; Image Interpretation, Computer-Assisted; Information Storage and Retrieval; Models, Statistical; Nonlinear Dynamics; Numerical Analysis, Computer-Assisted; Pattern Recognition, Automated; Signal Processing, Computer-Assisted;
Journal_Title :
Image Processing, IEEE Transactions on
DOI :
10.1109/TIP.2006.873473
