Bayesian Clustering of Shapes of Curves

The general goal here is to choose groups (clusters) of objects so as to maximize homogeneity within clusters and minimize homogeneity across clusters. The clustering problem has been addressed by researchers in many disciplines. A few well-known methods are metric based e.g. K-means (MacQueen et al., 1967), hierarchical clustering (Ward, 1963), clustering based on principal components, spectral clustering (Ng et al., 2002) and so on (Jain and Dubes, 1988; Ozawa, 1985). Traditional clustering methods are complemented by methods based on a probability model where one assumes a data generating distribution (e.g., Gaussian) and infers clustering configurations that maximize certain objective function (Banfield and Raftery, 1993; Fraley and Raftery, 1998, 2002, 2006; MacCullagh and Yang, 2008). A modelbased clustering can be useful in addressing challenges posed by traditional clustering methods. This is because a probability model allows the number of clusters to be treated as a parameter in the model, and can be embedded in a Bayesian framework providing quantification of uncertainty in the number of clusters and clustering configurations.