This paper provides both theoretical and algorithmic results for the l 1-relaxation of the Cheeger cut problem. The l2- relaxation, known as spectral clustering, only loosely relates to the Cheeger cut; however, it is convex and leads to a simple optimization problem. The l1-relaxation, in contrast, is non-convex but is provably equivalent to the original problem. The l1-relaxation therefore trades convexity for exactness, yielding improved clustering results at the cost of a more challenging optimization. The first challenge is understanding convergence of algorithms. This paper provides the first complete proof of convergence for algorithms that minimize the l1-relaxation. The second challenge entails comprehending the l1-energy landscape...
CLUHSIC is a recent clustering framework that unifies the geometric, spectral and statistical views ...
Clustering is often formulated as a discrete optimization problem. The objective is to find, among a...
The popular K-means clustering partitions a data set by minimiz-ing a sum-of-squares cost function. ...
Unsupervised clustering of scattered, noisy and high-dimensional data points is an important and dif...
Unsupervised clustering of scattered, noisy and high-dimensional data points is an important and dif...
This paper establishes the consistency of a family of graph-cut- based algorithms for clustering of ...
Spectral partitioning is a simple, nearly linear time algorithm to find sparse cuts, and the Cheeger...
Spectral Clustering as a relaxation of the normalized/ratio cut has become one of the standard graph...
Spectral clustering and its extensions usually consist of two steps: (1) constructing a graph and co...
In recent data mining research, the graph clustering methods, such as normalized cut and ratio cut, ...
Deterministic branch-and-bound algorithms for continuous global optimization often visit a large num...
Recently, Bilu and Linial [10] formalized an implicit assumption often made when choosing a clus-ter...
ABSTRACT. This paper establishes the consistency of a family of graph-cut-based algorithms for clus-...
Abstract. This paper establishes the consistency of spectral approaches to data clustering. We consi...
This paper establishes the consistency of spectral approaches to data clustering. We consider cluste...
CLUHSIC is a recent clustering framework that unifies the geometric, spectral and statistical views ...
Clustering is often formulated as a discrete optimization problem. The objective is to find, among a...
The popular K-means clustering partitions a data set by minimiz-ing a sum-of-squares cost function. ...
Unsupervised clustering of scattered, noisy and high-dimensional data points is an important and dif...
Unsupervised clustering of scattered, noisy and high-dimensional data points is an important and dif...
This paper establishes the consistency of a family of graph-cut- based algorithms for clustering of ...
Spectral partitioning is a simple, nearly linear time algorithm to find sparse cuts, and the Cheeger...
Spectral Clustering as a relaxation of the normalized/ratio cut has become one of the standard graph...
Spectral clustering and its extensions usually consist of two steps: (1) constructing a graph and co...
In recent data mining research, the graph clustering methods, such as normalized cut and ratio cut, ...
Deterministic branch-and-bound algorithms for continuous global optimization often visit a large num...
Recently, Bilu and Linial [10] formalized an implicit assumption often made when choosing a clus-ter...
ABSTRACT. This paper establishes the consistency of a family of graph-cut-based algorithms for clus-...
Abstract. This paper establishes the consistency of spectral approaches to data clustering. We consi...
This paper establishes the consistency of spectral approaches to data clustering. We consider cluste...
CLUHSIC is a recent clustering framework that unifies the geometric, spectral and statistical views ...
Clustering is often formulated as a discrete optimization problem. The objective is to find, among a...
The popular K-means clustering partitions a data set by minimiz-ing a sum-of-squares cost function. ...