Title :
Energetic lattice for optimizing over hierarchies of partitions
Author :
Serra, Jean ; Kiran, Bangalore Ravi
Author_Institution :
Lab. d´Inf. Gaspard-Monge, Univ. Paris-Est, Noisy-LeGrand, France
Abstract :
This theoretical paper introduces a novel continuous representation of hierarchy of partitions, and generalizes the conditions of h-increasingness and scale increasingness [1] to obtain a global-local optimum on the hierarchy. It studies in particular the Lagrange optimization problem and gives the condition on the energy to achieve constrained optimization, in the lattice of cuts in the hierarchy.
Keywords :
lattice theory; optimisation; Lagrange optimization problem; constrained optimization; energetic lattice; global-local optimum; h-increasingness; scale increasingness; Convergence; Image segmentation; Lattices; Minimization; Optimization; Silicon; Hierarchy; Lagrange; Mathematical Morphology; Optimal Cuts; Optimization;
Conference_Titel :
Image Processing (ICIP), 2014 IEEE International Conference on
Conference_Location :
Paris
DOI :
10.1109/ICIP.2014.7025984
