The aim of this paper is the classification, by means of the maximum path, of n statistical units described by k variables. The method develops in three steps. In the first step, in the minimum spanning tree, among all possible paths, we identify a path of maximum length that is the basis to define a pre-order on the n statistical units. In the multidimensional space, the maximum path can be considered as a `walk' in the mathematical meaning. In the second step, we provide a linearization of the minimum spanning tree with reference to the maximum path. The points on the lateral edges of the maximum path are shifted into the maximum path itself with regard to the ultrametric distance. In the last step, the maximum path and the lateral edges ...
We propose a new criterion for discriminative dimension reduction, max-min distance analysis (MMDA)....
Given a compact E⊂Rn and s>0, the maximum distance problem seeks a compact and connected subset o...
honors thesisCollege of ScienceMathematicsTom AlbertsWe study the linear algebra of the last passage...
The aim of this paper is the classification, by means of the maximum path, of n statistical units de...
AbstractWe study the problem of finding a length-constrained maximum-density path in a tree with wei...
This paper is aimed at combining both the properties of factorial subspaces and those of the Minimum...
In this paper, a general Maximum K-Min approach for classification is proposed, which focuses on max...
Let T =(V E w )be anundirected and weighted tree with node set V and edge set E, where w (e) is an e...
The Maximum Spanning Backbone k-Tree (BkT) problem, for k 2, is to find a maximum weight spanning k-...
AbstractWe further refine the bounds on the path length of binary trees of a given size by consideri...
The location of path-shaped facilities on trees has been receiving a growing attention in the specia...
AbstractWe show how to compute the maximum path length of binary trees with a given size and a given...
[[abstract]]In this paper, we study the problem of locating a median path of limited length on a tre...
[[abstract]]©2008 Elsevier-In this paper, we study the problem of locating a median path of limited ...
The distance of a tree is the sum of the distances between all pairs of vertices in the tree. This t...
We propose a new criterion for discriminative dimension reduction, max-min distance analysis (MMDA)....
Given a compact E⊂Rn and s>0, the maximum distance problem seeks a compact and connected subset o...
honors thesisCollege of ScienceMathematicsTom AlbertsWe study the linear algebra of the last passage...
The aim of this paper is the classification, by means of the maximum path, of n statistical units de...
AbstractWe study the problem of finding a length-constrained maximum-density path in a tree with wei...
This paper is aimed at combining both the properties of factorial subspaces and those of the Minimum...
In this paper, a general Maximum K-Min approach for classification is proposed, which focuses on max...
Let T =(V E w )be anundirected and weighted tree with node set V and edge set E, where w (e) is an e...
The Maximum Spanning Backbone k-Tree (BkT) problem, for k 2, is to find a maximum weight spanning k-...
AbstractWe further refine the bounds on the path length of binary trees of a given size by consideri...
The location of path-shaped facilities on trees has been receiving a growing attention in the specia...
AbstractWe show how to compute the maximum path length of binary trees with a given size and a given...
[[abstract]]In this paper, we study the problem of locating a median path of limited length on a tre...
[[abstract]]©2008 Elsevier-In this paper, we study the problem of locating a median path of limited ...
The distance of a tree is the sum of the distances between all pairs of vertices in the tree. This t...
We propose a new criterion for discriminative dimension reduction, max-min distance analysis (MMDA)....
Given a compact E⊂Rn and s>0, the maximum distance problem seeks a compact and connected subset o...
honors thesisCollege of ScienceMathematicsTom AlbertsWe study the linear algebra of the last passage...