Title :
Nonlinear relaxation labeling as growth transformation
Author :
Pelillo, Marcello
Author_Institution :
Dipartimento di Inf., Bari Univ., Italy
Abstract :
Presents some new results which demonstrate that, despite its heuristic and simple-minded derivation, the familiar nonlinear relaxation labeling algorithm of Rosenfeld et al. (1976) is in fact intimately related with a well-established theory of constraint satisfaction developed by Hummel and Zucker (1983). In particular, it is shown that, when a certain symmetry condition is met, the algorithm possesses a Liapunov function which turns out to be (the negative of) a well-known consistency measure. This follows almost immediately from a powerful result of Baum and Eagon (1967) developed in the context of Markov chain theory. These properties are also shown to naturally generalize to higher-order relaxation schemes. Some applications of the results presented here are finally outlined
Keywords :
Markov processes; Liapunov function; Markov chain theory; consistency measure; constraint satisfaction; growth transformation; nonlinear relaxation labeling; symmetry condition; Approximation algorithms; Bayesian methods; Constraint theory; Heuristic algorithms; Information resources; Labeling; Machine vision; Particle measurements; Pattern recognition; Uncertainty;
Conference_Titel :
Pattern Recognition, 1994. Vol. 2 - Conference B: Computer Vision & Image Processing., Proceedings of the 12th IAPR International. Conference on
Conference_Location :
Jerusalem
Print_ISBN :
0-8186-6270-0
DOI :
10.1109/ICPR.1994.576904
