Difference between revisions of "Dihedral group"
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| − | '' | + | ''dihedron group'' |
| − | A group isomorphic to the rotation group of a dihedron, i.e. of a regular doubled [[ | + | A finite group isomorphic to the rotation group of a dihedron, i.e. of a regular doubled [[pyramid]]. If the base of the pyramid is an $n$-gon, the corresponding dihedron group is of order $2n$ and is generated by two rotations $\phi$ and $\psi$ of orders $n$ and $2$ respectively, with the defining relation $\phi\psi\phi\psi=1$. An alternative description is the group of rotations and reflections of a regular $n$-gon, with $\phi$ as a rotation of order $n$ and $\psi$ as a reflection. In a finite group, two different elements of order 2 generate a dihedral group. |
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| + | The notation for the group varies: some author write $D_n$ and others $D_{2n}$ for the group of order $2n$. A dihedral group is sometimes understood to denote the dihedral group of order 8 only. | ||
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| + | The dihedral group is the [[semi-direct product]] of cyclic groups $C_2$ by $C_n$, with $C_2$ acting on $C_n$ by the non-trivial element of $C_2$ mapping each element of $C_n$ to its inverse. | ||
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| + | See also: [[Quasi-dihedral group]] | ||
====References==== | ====References==== | ||
<table><TR><TD valign="top">[1]</TD> <TD valign="top"> G.G. Hall, "Applied group theory" , Longman (1967)</TD></TR></table> | <table><TR><TD valign="top">[1]</TD> <TD valign="top"> G.G. Hall, "Applied group theory" , Longman (1967)</TD></TR></table> | ||
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| + | [[Category:Group theory and generalizations]] | ||
Latest revision as of 16:24, 19 October 2014
dihedron group
A finite group isomorphic to the rotation group of a dihedron, i.e. of a regular doubled pyramid. If the base of the pyramid is an $n$-gon, the corresponding dihedron group is of order $2n$ and is generated by two rotations $\phi$ and $\psi$ of orders $n$ and $2$ respectively, with the defining relation $\phi\psi\phi\psi=1$. An alternative description is the group of rotations and reflections of a regular $n$-gon, with $\phi$ as a rotation of order $n$ and $\psi$ as a reflection. In a finite group, two different elements of order 2 generate a dihedral group.
The notation for the group varies: some author write $D_n$ and others $D_{2n}$ for the group of order $2n$. A dihedral group is sometimes understood to denote the dihedral group of order 8 only.
The dihedral group is the semi-direct product of cyclic groups $C_2$ by $C_n$, with $C_2$ acting on $C_n$ by the non-trivial element of $C_2$ mapping each element of $C_n$ to its inverse.
See also: Quasi-dihedral group
References
| [1] | G.G. Hall, "Applied group theory" , Longman (1967) |
Dihedral group. Encyclopedia of Mathematics. URL: http://encyclopediaofmath.org/index.php?title=Dihedral_group&oldid=32459