Kleinberg introduced three natural clustering properties, or axioms, and showed they cannot be simultaneously satisfied by any clustering algorithm. We present a new clustering property, Monotonic Consistency, which avoids the well-known problematic behaviour of Kleinberg's Consistency axiom, and the impossibility result. Namely, we describe a clustering algorithm, Morse Clustering, inspired by Morse Theory in Differential Topology, which satisfies Kleinberg's original axioms with Consistency replaced by Monotonic Consistency. Morse clustering uncovers the underlying flow structure on a set or graph and returns a partition into trees representing basins of attraction of critical vertices. We also generalise Kleinberg's axiomatic approach to...
We investigate properties that intuitively ought to be satisfied by graph clustering quality functio...
Graph clustering is a fundamental computational problem with a number of applications in algorithm d...
We consider a smooth function f : M → R on a Riemannian submanifold M embedded in an ambient Euclide...
Kleinberg introduced three natural clustering properties, or axioms, and showed they cannot be simul...
Given a set of objects X a clustering algorithm is a formal procedure that groups together objects w...
Kleinberg (2002) stated three axioms that any clustering procedure should satisfy and showed there i...
The problem of finding groups in data (cluster analysis) has been extensively studied by researchers...
Many clustering schemes are defined by optimizing an objective function defined on the partitions of...
We study hierarchical clustering schemes under an axiomatic view. We show that within this framework...
Although the study of clustering is centered around an intuitively compelling goal, it has been very...
Abstract. This paper is on a graph clustering scheme inspired by ensemble learning. In short, the id...
We demonstrate that a tree-based theory for various dynamical processes operating on static, undirec...
We demonstrate that a tree-based theory for various dynamical processes operating on static, undirec...
Discrete Morse theory is a powerful tool combining ideas in both topology and combinatorics. Invente...
We study clustering over multiple graphs- each encoding a distinct set of similarity relationships (...
We investigate properties that intuitively ought to be satisfied by graph clustering quality functio...
Graph clustering is a fundamental computational problem with a number of applications in algorithm d...
We consider a smooth function f : M → R on a Riemannian submanifold M embedded in an ambient Euclide...
Kleinberg introduced three natural clustering properties, or axioms, and showed they cannot be simul...
Given a set of objects X a clustering algorithm is a formal procedure that groups together objects w...
Kleinberg (2002) stated three axioms that any clustering procedure should satisfy and showed there i...
The problem of finding groups in data (cluster analysis) has been extensively studied by researchers...
Many clustering schemes are defined by optimizing an objective function defined on the partitions of...
We study hierarchical clustering schemes under an axiomatic view. We show that within this framework...
Although the study of clustering is centered around an intuitively compelling goal, it has been very...
Abstract. This paper is on a graph clustering scheme inspired by ensemble learning. In short, the id...
We demonstrate that a tree-based theory for various dynamical processes operating on static, undirec...
We demonstrate that a tree-based theory for various dynamical processes operating on static, undirec...
Discrete Morse theory is a powerful tool combining ideas in both topology and combinatorics. Invente...
We study clustering over multiple graphs- each encoding a distinct set of similarity relationships (...
We investigate properties that intuitively ought to be satisfied by graph clustering quality functio...
Graph clustering is a fundamental computational problem with a number of applications in algorithm d...
We consider a smooth function f : M → R on a Riemannian submanifold M embedded in an ambient Euclide...