Add to ORKGIn this paper we describe the data structures and the procedures of a program, which is based on the algorithms of [5,6]. Knowing the incidence structure of a polyhedron, the program finds all the essentially different facet pairings. The transformations, pairing the facets generate a space group, for which the polyhedron is a fundamental domain. The program also creates the defining relations of the group. Thus, we obtain discrete groups of certain combinatorial spaces. We have still to examine which groups can be realised in spaces of constant curvature (or in other simply connected spaces). Finally, we mention some results: Examining the 4-simplex, o...
In the rst part of the paper we survey some far-reaching applications of the basic facts of linear p...
The theory of the regular and semi-regular polyhedra is a classical topic of geometry. However, in m...
AbstractWe give an algorithm that constructs the Hasse diagram of the face lattice of a convex polyt...
In this paper we describe the data structures and the procedures of a program, which is...
We describe computer algorithms that produce the complete set of isohedral tilings by n-omino or n-i...
In this paper we introduce a polyhedron algorithm that has been developed for finding space groups. ...
We address ourselves to three types of combinatorial and projective problems, all of which concern ...
2021 Fall.Includes bibliographical references.A convex polyhedron is the convex hull of a finite set...
Abstract The paper surveys highlights of the ongoing program to classify discrete polyhedral structu...
This book consists of contributions from experts, presenting a fruitful interplay between different ...
Discrete geometry investigates combinatorial properties of configurations of geometric objects. To a...
This book presents a course in the geometry of convex polytopes in arbitrary dimension, suitable for...
We describe computer algorithms that produce the complete set of isohedral tilings by n-omino or n-i...
Faces play a central role in the combinatorial and computational aspects of polyhedra. In this paper...
. The purpose of this paper is to popularize the method of D-symbols (Delone--Delaney--Dress symbols...
In the rst part of the paper we survey some far-reaching applications of the basic facts of linear p...
The theory of the regular and semi-regular polyhedra is a classical topic of geometry. However, in m...
AbstractWe give an algorithm that constructs the Hasse diagram of the face lattice of a convex polyt...
In this paper we describe the data structures and the procedures of a program, which is...
We describe computer algorithms that produce the complete set of isohedral tilings by n-omino or n-i...
In this paper we introduce a polyhedron algorithm that has been developed for finding space groups. ...
We address ourselves to three types of combinatorial and projective problems, all of which concern ...
2021 Fall.Includes bibliographical references.A convex polyhedron is the convex hull of a finite set...
Abstract The paper surveys highlights of the ongoing program to classify discrete polyhedral structu...
This book consists of contributions from experts, presenting a fruitful interplay between different ...
Discrete geometry investigates combinatorial properties of configurations of geometric objects. To a...
This book presents a course in the geometry of convex polytopes in arbitrary dimension, suitable for...
We describe computer algorithms that produce the complete set of isohedral tilings by n-omino or n-i...
Faces play a central role in the combinatorial and computational aspects of polyhedra. In this paper...
. The purpose of this paper is to popularize the method of D-symbols (Delone--Delaney--Dress symbols...
In the rst part of the paper we survey some far-reaching applications of the basic facts of linear p...
The theory of the regular and semi-regular polyhedra is a classical topic of geometry. However, in m...
AbstractWe give an algorithm that constructs the Hasse diagram of the face lattice of a convex polyt...