We propose two related unsupervised clustering algorithms which, for input, take data assumed to be sampled from a uniform distribution supported on a metric space $X$, and output a clustering of the data based on the selection of a topological model for the connected components of $X$. Both algorithms work by selecting a graph on the samples from a natural one-parameter family of graphs, using a geometric criterion in the first case and an information theoretic criterion in the second. The estimated connected components of $X$ are identified with the kernel of the associated graph Laplacian, which allows the algorithm to work without requiring the number of expected clusters or other auxiliary data as input.Comment: 21 Page
International audienceThis article considers spectral community detection in the regime of sparse ne...
Persistent homology is a methodology central to topological data analysis that extracts and summariz...
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We discuss topological aspects of cluster analysis and show that inferring the topological structure...
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In recent years, spectral clustering has become one of the most popular modern clustering algorithms...
International audienceFollowing Hartigan, a cluster is defined as a connected component of the t-lev...
Clustering $\unicode{x2013}$ the tendency for neighbors of nodes to be connected $\unicode{x2013}$ q...
Spectral clustering methods allow to partition a dataset into clusters by mapping the input datapoin...
International audienceThis article considers spectral community detection in the regime of sparse ne...
Persistent homology is a methodology central to topological data analysis that extracts and summariz...
When it comes to clustering nonconvex shapes, two paradigms are used to find the most suitable clust...
International audienceSpectral clustering refers to a family of well-known unsupervised learning alg...
We discuss topological aspects of cluster analysis and show that inferring the topological structure...
Spectral clustering is a popular and successful approach for partitioning the nodes of a graph into ...
We analyze the spectral clustering procedure for identifying coarse structure in a data set x₁,…,x_n...
In this work we study the widely used spectral clustering algorithms, i.e. partition a graph into k ...
Abstract. Spectral methods have received attention as powerful theoretical and prac-tical approaches...
Spectral clustering consists in creating, from the spectral elements of a Gaussian affinity matrix, ...
Consistency is a key property of statistical algorithms, when the data is drawn from some underlying...
In recent years, spectral clustering has become one of the most popular modern clustering algorithms...
International audienceFollowing Hartigan, a cluster is defined as a connected component of the t-lev...
Clustering $\unicode{x2013}$ the tendency for neighbors of nodes to be connected $\unicode{x2013}$ q...
Spectral clustering methods allow to partition a dataset into clusters by mapping the input datapoin...
International audienceThis article considers spectral community detection in the regime of sparse ne...
Persistent homology is a methodology central to topological data analysis that extracts and summariz...
When it comes to clustering nonconvex shapes, two paradigms are used to find the most suitable clust...