Examples of 'coxeter' in a sentence
Meaning of "coxeter"
The noun 'coxeter' refers to a type of mathematician known for their work in geometry
Show more definitions
- A surname.
How to use "coxeter" in a sentence
Basic
Advanced
coxeter
Coxeter and they worked together on various problems.
There are many infinite hyperbolic Coxeter groups.
Coxeter groups find applications in many areas of mathematics.
Symmetric groups are Coxeter groups and reflection groups.
Coxeter represents these groups by the following symbols.
An important example is in the Coxeter groups.
Coxeter developed the theory further.
Note that this article assumes a finite Coxeter group.
Coxeter groups in the plane with equivalent diagrams.
Elte provided a definition which Coxeter found too artificial.
Coxeter was the main driving force behind the work.
It was a starting point toward the more general Coxeter diagram.
Coxeter used them to enumerate all but one of the uniform polyhedra.
All symmetry groups of regular polytopes are finite Coxeter groups.
Coxeter et al.
See also
I know of only one complete Coxeter kit in the country.
A Coxeter element is a product of all simple reflections.
The generators are related to oriented edges of the Coxeter graph.
Coxeter graphs of the finite Coxeter groups.
Combinatorial approach to clusters using sortable elements of Coxeter groups.
Presentation of Coxeter groups by generators and relations.
The finite groups generated in this way are examples of Coxeter groups.
Two affine Coxeter groups can be multiplied together.
These construction operations are represented by the permutations of rings of the Coxeter diagrams.
He and Coxeter had worked together on many mathematical problems.
We give a characterization of CPC elements in terms of cylindrical closures in any Coxeter groups.
This is the Coxeter complex of the infinite dihedral group.
They can also be defined independently as deformations of group algebras of finite Coxeter groups.
There are many different ways to define the Coxeter number h of an irreducible root system.
This is the only known positive interpretation of these coefficients for arbitrary Coxeter groups.
Some properties of the finite irreducible Coxeter groups are given in the following table.
Coxeter introduces and uses the groups generated by reflections that became known as Coxeter groups.
Thus the disjoint union of Coxeter graphs yields a direct product of Coxeter groups.
Coxeter matrix and Schläfli matrix.
The related pure reflectional Coxeter group are given with all classes except oblique.
The Coxeter number for each coxeter group symmetry expresses how many sides a petrie polygon has.
Quadrilaterals may also have Coxeter decompositions.
Its Coxeter diagram is empty.
We further investigate the Delaunay property for Coxeter triangulations.
The affine Coxeter groups form a second important series of Coxeter groups.
Reflection groups also include Weyl groups and crystallographic Coxeter groups.
All Coxeter group Schläfli matrices are symmetric because their root vectors are normalized.
Families of convex uniform Euclidean tessellations are defined by the affine Coxeter groups.
Coxeter named them after Édouard Goursat who first looked into these domains.
Every apartment A in a building is a Coxeter complex.
Coxeter diagrams for the Affine Coxeter groups.
A quote from Coxeter on Phyllotaxis.
The prize was named in honor of the mathematicians Donald Coxeter and Ralph James.
The Coxeter complex.
Those shears are by Coxeter of England.
