Title :
Image segmentation by convex quadratic programming
Author :
Rivera, Mariano ; Dalmau, Oscar ; Tago, Josue
Author_Institution :
Centro de Investig. en Mat. A.C.
Abstract :
A quadratic programming formulation for multiclass image segmentation is investigated. It is proved that, in the convex case, the non-negativity constraint on the recent reported quadratic Markov measure field model can be neglected and the solution preserves the probability measure property. This allows one to design efficient optimization algorithms. Additionally, it is proposed a (free parameter) inter-pixel affinity measure which is more related with classes memberships than with color or gray gradient based standard methods. Moreover, it is introduced a formulation for computing the pixel likelihoods by taking into account local context and texture properties.
Keywords :
Markov processes; convex programming; gradient methods; image colour analysis; image segmentation; image texture; maximum likelihood estimation; probability; quadratic programming; convex quadratic programming formulation; gray gradient method; inter-pixel affinity measure; likelihood computation; multiclass image segmentation; nonnegativity constraint; probability measure property; quadratic Markov measure field model; texture property; Algorithm design and analysis; Clustering algorithms; Constraint optimization; Design optimization; Image segmentation; Maximum likelihood estimation; Measurement standards; Pixel; Quadratic programming; Robustness;
Conference_Titel :
Pattern Recognition, 2008. ICPR 2008. 19th International Conference on
Conference_Location :
Tampa, FL
Print_ISBN :
978-1-4244-2174-9
Electronic_ISBN :
1051-4651
DOI :
10.1109/ICPR.2008.4761385
