The minimum height of vertex and edge partition trees are well-studied graph parameters known as, for instance, vertex and edge ranking number. While they are NP-hard to determine in general, linear-time algorithms exist for trees. Motivated by a correspondence with Dasgupta’s objective for hierarchical clustering we consider the total rather than maximum depth of vertices as an alternative objective for minimization. For vertex partition trees this leads to a new parameter with a natural interpretation as a measure of robustness against vertex removal. As tools for the study of this family of parameters we show that they have similar recursive expressions and prove a binary tree rotation lemma. The new parameter is related to trivially per...
AbstractA k-edge ranking of an undirected graph is a labeling of the edges of the graph with integer...
We perform new theoretical as well as first-time experimental studies for the NP-hard problem to fin...
Clustering problems with relational constraints in which the underlying graph is a tree arise in a v...
International audienceThe minimum height of vertex and edge partition trees are well-studied graph p...
We study the complexity of finding an optimal hierarchical clustering of an unweighted similarity gr...
We study the complexity of finding an optimal hierarchical clustering of an unweighted similarity gr...
Hierarchical clustering is a recursive partitioning of a dataset into clusters at an increasingly fi...
Hierarchical Clustering is an unsupervised data analysis method which has been widely used for decad...
Hierarchical clustering is a recursive partitioning of a dataset into clusters at an increasingly fi...
Hierarchical clustering is a recursive partitioning of a dataset into clusters at an increasingly fi...
We present algorithms for computing hierarchical decompositions of trees satisfying different optimi...
AbstractWe present algorithms for computing hierarchical decompositions of trees satisfying differen...
In this paper we introduce a simple clustering method for undirected graphs. The clustering method u...
This paper explores hierarchical clustering in the case where pairs of points have dissimilarity sco...
In this paper, we propose a parameter-insensitive data partitioning approach for Chameleon, a hierar...
AbstractA k-edge ranking of an undirected graph is a labeling of the edges of the graph with integer...
We perform new theoretical as well as first-time experimental studies for the NP-hard problem to fin...
Clustering problems with relational constraints in which the underlying graph is a tree arise in a v...
International audienceThe minimum height of vertex and edge partition trees are well-studied graph p...
We study the complexity of finding an optimal hierarchical clustering of an unweighted similarity gr...
We study the complexity of finding an optimal hierarchical clustering of an unweighted similarity gr...
Hierarchical clustering is a recursive partitioning of a dataset into clusters at an increasingly fi...
Hierarchical Clustering is an unsupervised data analysis method which has been widely used for decad...
Hierarchical clustering is a recursive partitioning of a dataset into clusters at an increasingly fi...
Hierarchical clustering is a recursive partitioning of a dataset into clusters at an increasingly fi...
We present algorithms for computing hierarchical decompositions of trees satisfying different optimi...
AbstractWe present algorithms for computing hierarchical decompositions of trees satisfying differen...
In this paper we introduce a simple clustering method for undirected graphs. The clustering method u...
This paper explores hierarchical clustering in the case where pairs of points have dissimilarity sco...
In this paper, we propose a parameter-insensitive data partitioning approach for Chameleon, a hierar...
AbstractA k-edge ranking of an undirected graph is a labeling of the edges of the graph with integer...
We perform new theoretical as well as first-time experimental studies for the NP-hard problem to fin...
Clustering problems with relational constraints in which the underlying graph is a tree arise in a v...