Title :
A Convergence Theorem for the Fuzzy ISODATA Clustering Algorithms
Author :
Bezdek, James C.
Author_Institution :
Department of Mathematics, Utah State University, Logan, UT 84322.
Abstract :
In this paper the convergence of a class of clustering procedures, popularly known as the fuzzy ISODATA algorithms, is established. The theory of Zangwill is used to prove that arbitrary sequences generated by these (Picard iteration) procedures always terminates at a local minimum, or at worst, always contains a subsequence which converges to a local minimum of the generalized least squares objective functional which defines the problem.
Keywords :
Clustering algorithms; Convergence of numerical methods; Fuzzy sets; Iterative algorithms; Least squares methods; Mathematics; Minimization methods; Partitioning algorithms; Cluster analysis; convergence of fuzzy ISODATA; fuzzy sets; generalized least squares; iterative optimization;
Journal_Title :
Pattern Analysis and Machine Intelligence, IEEE Transactions on
DOI :
10.1109/TPAMI.1980.4766964
