TY - GEN
T1 - Variable-geometry clustering and its optimization
AU - Pedrycz, Adam
AU - Dong, Fangyan
AU - Hirota, Kaoru
PY - 2009
Y1 - 2009
N2 - Clustering is often viewed as a synonym of techniques used to reveal the structure in data. The inherent geometrical diversity of data is a strong motivating factor to search for geometrically flexible clusters design supported by the clustering algorithms. In this study, we introduce a concept of geometrically variable fuzzy clustering (making use of Fuzzy C-Means, FCM), in which the fuzzification coefficients are associated with individual clusters thus endowing them with significant geometric flexibility. We introduce a hybrid optimization environment in which both global and local optimization mechanisms are engaged. The global optimization is supported by evolutionary computing (and particle swarm optimization, PSO, in particular) whereas the local optimization is realized by adopting some modified iterative schemes encountered in FCM. We show that this hybrid vehicle of optimization is of interest when dealing with comprehensive fitness functions which quantify a general view at the results of clustering (such as e.g., the one expressed by cluster validity indexes or the one articulating the mapping- reconstruction capabilities of the clusters).
AB - Clustering is often viewed as a synonym of techniques used to reveal the structure in data. The inherent geometrical diversity of data is a strong motivating factor to search for geometrically flexible clusters design supported by the clustering algorithms. In this study, we introduce a concept of geometrically variable fuzzy clustering (making use of Fuzzy C-Means, FCM), in which the fuzzification coefficients are associated with individual clusters thus endowing them with significant geometric flexibility. We introduce a hybrid optimization environment in which both global and local optimization mechanisms are engaged. The global optimization is supported by evolutionary computing (and particle swarm optimization, PSO, in particular) whereas the local optimization is realized by adopting some modified iterative schemes encountered in FCM. We show that this hybrid vehicle of optimization is of interest when dealing with comprehensive fitness functions which quantify a general view at the results of clustering (such as e.g., the one expressed by cluster validity indexes or the one articulating the mapping- reconstruction capabilities of the clusters).
KW - Clustering
KW - Fuzzy C-means (FCM)
KW - Optimization
KW - Particle swarm optimization (PSO)
KW - Variable-geometry
UR - http://www.scopus.com/inward/record.url?scp=74849093409&partnerID=8YFLogxK
U2 - 10.1109/ICSMC.2009.5346949
DO - 10.1109/ICSMC.2009.5346949
M3 - Conference contribution
AN - SCOPUS:74849093409
SN - 9781424427949
T3 - Conference Proceedings - IEEE International Conference on Systems, Man and Cybernetics
SP - 680
EP - 685
BT - Proceedings 2009 IEEE International Conference on Systems, Man and Cybernetics, SMC 2009
T2 - 2009 IEEE International Conference on Systems, Man and Cybernetics, SMC 2009
Y2 - 11 October 2009 through 14 October 2009
ER -