Add to ORKGAlgorithms for quantifying the differences between two lattices are used for Bravais lattice determination, database lookup for unit cells to select candidates for molecular replacement, and recently for clustering to group together images from serial crystallography. It is particularly desirable for the differences between lattices to be computed as a perturbation-stable metric, i.e. as distances that satisfy the triangle inequality, so that standard tree-based nearest-neighbor algorithms can be used, and for which small changes in the lattices involved produce small changes in the distances computed. A perturbation-stable metric space related to the reduction algorithm of Selling and to the Bravais lattice determination methods of Delone ...
Given the ubiquity of lattice models in physics, it is imperative for researchers to possess robust ...
The K-means clustering algorithm works on a data set with n data points in d dimensional space R^d. ...
This paper develops a new continuous approach to a similarity between periodic lattices of ideal cry...
We discuss algorithms for lattice based computations, in particular lattice reduction, the de-tectio...
Several methods in data and shape analysis can be regarded as transformations between metric spaces....
Bravais lattices are the most fundamental building blocks of crystallography. They are classified in...
In order to characterize molecular structures we introduce configurational fingerprint vectors which...
The task of clustering is at the same time challenging and very important in Artificial Intelligence...
Part 5: Classification - ClusteringInternational audienceIn many cases of high dimensional data anal...
Dedicated to the 80th birthday of Professor Frank Harary Molecular shape equivalence classes defined...
This paper develops geographic style maps containing two-dimensional lattices in all known periodic ...
Clustering is the process of grouping a set of objects into clusters so that objects within a cluste...
Motivation: A large fraction of biological research concentrates on individual proteins and on small...
Clustering algorithms partition a collection of objects into a certain number of clusters (groups, s...
There are many distance-based methods for classification and clustering, and for data with a high nu...
Given the ubiquity of lattice models in physics, it is imperative for researchers to possess robust ...
The K-means clustering algorithm works on a data set with n data points in d dimensional space R^d. ...
This paper develops a new continuous approach to a similarity between periodic lattices of ideal cry...
We discuss algorithms for lattice based computations, in particular lattice reduction, the de-tectio...
Several methods in data and shape analysis can be regarded as transformations between metric spaces....
Bravais lattices are the most fundamental building blocks of crystallography. They are classified in...
In order to characterize molecular structures we introduce configurational fingerprint vectors which...
The task of clustering is at the same time challenging and very important in Artificial Intelligence...
Part 5: Classification - ClusteringInternational audienceIn many cases of high dimensional data anal...
Dedicated to the 80th birthday of Professor Frank Harary Molecular shape equivalence classes defined...
This paper develops geographic style maps containing two-dimensional lattices in all known periodic ...
Clustering is the process of grouping a set of objects into clusters so that objects within a cluste...
Motivation: A large fraction of biological research concentrates on individual proteins and on small...
Clustering algorithms partition a collection of objects into a certain number of clusters (groups, s...
There are many distance-based methods for classification and clustering, and for data with a high nu...
Given the ubiquity of lattice models in physics, it is imperative for researchers to possess robust ...
The K-means clustering algorithm works on a data set with n data points in d dimensional space R^d. ...
This paper develops a new continuous approach to a similarity between periodic lattices of ideal cry...