We consider approximating distributions within the framework of optimal mass transport and specialize to the problem of clustering data sets. Distances between distributions are measured in the Wasserstein metric. The main problem we consider is that of approximating sample distributions by ones with sparse support. This provides a new viewpoint to clustering. We propose different relaxations of a cardinality function which penalizes the size of the support set. We establish that a certain relaxation provides the tightest convex lower approximation to the cardinality penalty. We compare the performance of alternative relaxations on a numerical study on clustering
k-means clustering is a popular approach to clustering. It is easy to implement and intuitive but ha...
We present a new clustering algorithm by proposing a convex relaxation of hierarchical clustering, w...
16 pagesSum-of-norms clustering is a convex optimization problem whose solution can be used for the ...
Abstract. We consider approximating distributions within the framework of optimal mass transport and...
ABSTRACT. In this paper, we initiate the study of exact recovery conditions for convex relaxations o...
The problem of finding clusters in a graph arises in several ap-plications such as social networks, ...
The problem of finding clusters in a graph arises in several applications such as social networks, d...
We suggest using the max-norm as a convex surrogate constraint for clustering. We show how this yiel...
Clustering is often formulated as a discrete optimization problem. The objective is to find, among a...
We formulate ensemble clustering as a regularization problem over nuclear norm and cluster-wise grou...
Clustering is often formulated as a discrete optimization problem. The objective is to find, among a...
Clustering is often formulated as a discrete optimization problem. The objective is to find, among a...
Address email Clustering is often formulated as the maximum likelihood estimation of a mixture model...
Ces travaux traitent de la problématique du partitionnement d'un ensemble d'observations ou de varia...
A popular apprach for solving complex optimization problems is through relaxation: some constraints ...
k-means clustering is a popular approach to clustering. It is easy to implement and intuitive but ha...
We present a new clustering algorithm by proposing a convex relaxation of hierarchical clustering, w...
16 pagesSum-of-norms clustering is a convex optimization problem whose solution can be used for the ...
Abstract. We consider approximating distributions within the framework of optimal mass transport and...
ABSTRACT. In this paper, we initiate the study of exact recovery conditions for convex relaxations o...
The problem of finding clusters in a graph arises in several ap-plications such as social networks, ...
The problem of finding clusters in a graph arises in several applications such as social networks, d...
We suggest using the max-norm as a convex surrogate constraint for clustering. We show how this yiel...
Clustering is often formulated as a discrete optimization problem. The objective is to find, among a...
We formulate ensemble clustering as a regularization problem over nuclear norm and cluster-wise grou...
Clustering is often formulated as a discrete optimization problem. The objective is to find, among a...
Clustering is often formulated as a discrete optimization problem. The objective is to find, among a...
Address email Clustering is often formulated as the maximum likelihood estimation of a mixture model...
Ces travaux traitent de la problématique du partitionnement d'un ensemble d'observations ou de varia...
A popular apprach for solving complex optimization problems is through relaxation: some constraints ...
k-means clustering is a popular approach to clustering. It is easy to implement and intuitive but ha...
We present a new clustering algorithm by proposing a convex relaxation of hierarchical clustering, w...
16 pagesSum-of-norms clustering is a convex optimization problem whose solution can be used for the ...