Title :
Probabilistic Clustering Using the Baum-Eagon Inequality
Author :
Rota Bulo, S. ; Pelillo, Marcello
Author_Institution :
DSI, Univ. of Venice, Venice, Italy
Abstract :
The paper introduces a framework for clustering data objects in a similarity-based context. The aim is to cluster objects into a given number of classes without imposing a hard partition, but allowing for a soft assignment of objects to clusters. Our approach uses the assumption that similarities reflect the likelihood of the objects to be in a same class in order to derive a probabilistic model for estimating the unknown cluster assignments. This leads to a polynomial optimization in probability domain, which is tackled by means of a result due to Baum and Eagon. Experiments on both synthetic and real standard datasets show the effectiveness of our approach.
Keywords :
pattern clustering; polynomials; probability; Baum-Eagon inequality; cluster assignment; data object clustering; object likelihood; polynomial optimization; probabilistic clustering; probabilistic model; probability domain; similarity-based context; Iris; Iris recognition; Markov processes; Optimization; Polynomials; Probabilistic logic; Proteins;
Conference_Titel :
Pattern Recognition (ICPR), 2010 20th International Conference on
Conference_Location :
Istanbul
Print_ISBN :
978-1-4244-7542-1
DOI :
10.1109/ICPR.2010.353
