The Estimation of Ultrametric and Path Length Trees from Rectangular Proximity Data
- 1 September 1984
- journal article
- Published by Cambridge University Press (CUP) in Psychometrika
- Vol. 49 (3) , 289-310
- https://doi.org/10.1007/bf02306021
Abstract
A least-squares algorithm for fitting ultrametric and path length or additive trees to two-way, two-mode proximity data is presented. The algorithm utilizes a penalty function to enforce the ultrametric inequality generalized for asymmetric, and generally rectangular (rather than square) proximity matrices in estimating an ultrametric tree. This stage is used in an alternating least-squares fashion with closed-form formulas for estimating path length constants for deriving path length trees. The algorithm is evaluated via two Monte Carlo studies. Examples of fitting ultrametric and path length trees are presented.Keywords
This publication has 17 references indexed in Scilit:
- The representation of three-way proximity data by single and multiple tree structure modelsJournal of Classification, 1984
- A Least Squares Algorithm for Fitting Additive Trees to Proximity DataPsychometrika, 1983
- Gennclus: New Models for General Nonhierarchical Clustering AnalysisPsychometrika, 1982
- Free trees and bidirectional trees as representations of psychological distanceJournal of Mathematical Psychology, 1978
- Spatial, Non-Spatial and Hybrid Models for ScalingPsychometrika, 1976
- Modal Blocks in Dentition of West Coast MammalsSystematic Zoology, 1976
- Unrooted trees for numerical taxonomyJournal of Applied Probability, 1974
- Estimating Phylogenetic Trees from Distance MatricesThe American Naturalist, 1972
- Representation of Similarity Matrices by TreesJournal of the American Statistical Association, 1967
- Orthogonal Main-Effect Plans for Asymmetrical Factorial ExperimentsTechnometrics, 1962