Cyclic maximal subgroup of dihedral group:D16: Difference between revisions

This article is about a particular subgroup in a group, up to equivalence of subgroups (i.e., an isomorphism of groups that induces the corresponding isomorphism of subgroups). The subgroup is (up to isomorphism) cyclic group:Z8 and the group is (up to isomorphism) dihedral group:D16 (see subgroup structure of dihedral group:D16).
The subgroup is a normal subgroup and the quotient group is isomorphic to cyclic group:Z2.
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Here, ${\displaystyle G}$ is the dihedral group:D16, the dihedral group of order sixteen (and hence, degree eight). We use here the presentation:

${\displaystyle G:=\langle a,x\mid a^{8}=x^{2}=e,xax=a^{-1}\rangle }$

${\displaystyle G}$ has 16 elements:

${\displaystyle \!\{e,a,a^{2},a^{3},a^{4},a^{5},a^{6},a^{7},x,ax,a^{2}x,a^{3}x,a^{4}x,a^{5}x,a^{6}x,a^{7}x\}}$

The subgroup ${\displaystyle H}$ of interest is the subgroup ${\displaystyle \langle a\rangle }$. It is cyclic of order 8 and is given by:

${\displaystyle \!\{e,a,a^{2},a^{3},a^{4},a^{5},a^{6},a^{7}\}}$

Cosets

The subgroup has index two and is hence normal (since index two implies normal). Its left cosets coincide with its right cosets, and there are two cosets:

${\displaystyle \!H=\{e,a,a^{2},a^{3},a^{4},a^{5},a^{6},a^{7}\},G\setminus H=\{x,ax,a^{2}x,a^{3}x,a^{4}x,a^{5}x,a^{6}x,a^{7}x\}}$

Complements

COMPLEMENTS TO NORMAL SUBGROUP: TERMS/FACTS TO CHECK AGAINST:
TERMS: permutable complements | permutably complemented subgroup | lattice-complemented subgroup | complemented normal subgroup (normal subgroup that has permutable complement, equivalently, that has lattice complement) | retract (subgroup having a normal complement)
FACTS: complement to normal subgroup is isomorphic to quotient | complements to abelian normal subgroup are automorphic | complements to normal subgroup need not be automorphic | Schur-Zassenhaus theorem (two parts: normal Hall implies permutably complemented and Hall retract implies order-conjugate)

There are eight possible permutable complements to ${\displaystyle H}$ in ${\displaystyle G}$, all of them automorphic to each other:

${\displaystyle \!\{e,x\},\{e,ax\},\{e,a^{2}x\},\{e,a^{3}x\},\{e,a^{4}x\},\{e,a^{5}x\},\{e,a^{6}x\},\{e,a^{7}x\}}$

Properties related to complementation

Arithmetic functions

Effect of subgroup operators

Function	Value as subgroup (descriptive)	Value as subgroup (link)	Value as group
normalizer	whole group	--	dihedral group:D16
centralizer	${\displaystyle \langle a\rangle }$ -- the subgroup itself	current page	cyclic group:Z8
normal core	the subgroup itself	current page	cyclic group:Z8
normal closure	the subgroup itself	current page	cyclic group:Z8
characteristic core	the subgroup itself	current page	cyclic group:Z8
characteristic closure	the subgroup itself	current page	cyclic group:Z8

Subgroup-defining functions

Subgroup-defining function	Meaning in general	Why it takes this value
centralizer of derived subgroup	centralizer of the derived subgroup (the commutator of the group with itself)	The derived subgroup is ${\displaystyle \langle a^{2}\rangle }$, which is centralized by all of ${\displaystyle \langle a\rangle }$ and by nothing outside it.