Crystallographic point group and List of finite spherical symmetry groups

Shortcuts: Differences, Similarities, Jaccard Similarity Coefficient, References.

Difference between Crystallographic point group and List of finite spherical symmetry groups

Crystallographic point group vs. List of finite spherical symmetry groups

In crystallography, a crystallographic point group is a set of symmetry operations, like rotations or reflections, that leave a central point fixed while moving other directions and faces of the crystal to the positions of features of the same kind. Finite spherical symmetry groups are also called point groups in three dimensions.

Similarities between Crystallographic point group and List of finite spherical symmetry groups

Crystallographic point group and List of finite spherical symmetry groups have 8 things in common (in Unionpedia): Coxeter notation, Crystallography, Cyclic group, Dihedral group, Hermann–Mauguin notation, Orbifold notation, Point groups in three dimensions, Schoenflies notation.

Coxeter notation

In geometry, Coxeter notation (also Coxeter symbol) is a system of classifying symmetry groups, describing the angles between with fundamental reflections of a Coxeter group in a bracketed notation expressing the structure of a Coxeter-Dynkin diagram, with modifiers to indicate certain subgroups.

Coxeter notation and Crystallographic point group · Coxeter notation and List of finite spherical symmetry groups · See more »

Crystallography

Crystallography is the experimental science of determining the arrangement of atoms in crystalline solids (see crystal structure).

Crystallographic point group and Crystallography · Crystallography and List of finite spherical symmetry groups · See more »

Cyclic group

In algebra, a cyclic group or monogenous group is a group that is generated by a single element.

Crystallographic point group and Cyclic group · Cyclic group and List of finite spherical symmetry groups · See more »

Dihedral group

In mathematics, a dihedral group is the group of symmetries of a regular polygon, which includes rotations and reflections.

Crystallographic point group and Dihedral group · Dihedral group and List of finite spherical symmetry groups · See more »

Hermann–Mauguin notation

In geometry, Hermann–Mauguin notation is used to represent the symmetry elements in point groups, plane groups and space groups.

Crystallographic point group and Hermann–Mauguin notation · Hermann–Mauguin notation and List of finite spherical symmetry groups · See more »

Orbifold notation

In geometry, orbifold notation (or orbifold signature) is a system, invented by William Thurston and popularized by the mathematician John Conway, for representing types of symmetry groups in two-dimensional spaces of constant curvature.

Crystallographic point group and Orbifold notation · List of finite spherical symmetry groups and Orbifold notation · See more »

Point groups in three dimensions

In geometry, a point group in three dimensions is an isometry group in three dimensions that leaves the origin fixed, or correspondingly, an isometry group of a sphere.

Crystallographic point group and Point groups in three dimensions · List of finite spherical symmetry groups and Point groups in three dimensions · See more »

Schoenflies notation

The Schoenflies (or Schönflies) notation, named after the German mathematician Arthur Moritz Schoenflies, is one of two conventions commonly used to describe point groups.

Crystallographic point group and Schoenflies notation · List of finite spherical symmetry groups and Schoenflies notation · See more »

The list above answers the following questions

What Crystallographic point group and List of finite spherical symmetry groups have in common
What are the similarities between Crystallographic point group and List of finite spherical symmetry groups

Crystallographic point group and List of finite spherical symmetry groups Comparison

Crystallographic point group has 36 relations, while List of finite spherical symmetry groups has 28. As they have in common 8, the Jaccard index is 12.50% = 8 / (36 + 28).

References

This article shows the relationship between Crystallographic point group and List of finite spherical symmetry groups. To access each article from which the information was extracted, please visit:

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