Groups of order 8: Difference between revisions

This article gives information about, and links to more details on, groups of order 8
See pages on algebraic structures of order 8 | See pages on groups of a particular order

This article gives basic information comparing and contrasting the groups of order ${\displaystyle 8}$. See also more detailed information on specific subtopics through the links:

The list

Common name for group	Second part of GAP ID (GAP ID is (8,second part))	Hall-Senior number	Hall-Senior symbol
cyclic group:Z8	1	3	${\displaystyle (3)}$
direct product of Z4 and Z2	2	2	${\displaystyle (21)}$
dihedral group:D8	3	4	${\displaystyle 8\Gamma _{2}a_{1}}$
quaternion group	4	5	${\displaystyle 8\Gamma _{2}a_{2}}$
elementary abelian group:E8	5	1	${\displaystyle (1^{3})}$

Subgroup/quotient relationships

Subgroup relationships

Quotient relationships

Arithmetic functions

Functions taking values between 0 and 3

Here now is the same table along with various measures of averages and deviations: [SHOW MORE]

Same, with rows and columns interchanged:

Here are the correlations between these various arithmetic functions across the groups of order 8: [SHOW MORE]

Arithmetic function values of a counting nature

Here is the same table, with rows and columns interchanged:

Arithmetic function values of a representational nature

Group	GAP ID (second part)	Hall-senior number	minimum degree of faithful permutation representation	minimum degree of faithful transitive permutation representation	minimum degree of faithful linear representation over ${\displaystyle \mathbb {C} }$	symmetric genus
cyclic group:Z8	1	3	8	8	1	?
direct product of Z4 and Z2	2	2	6	8 (at most)	2	?
dihedral group:D8	3	4	4	4	2	?
quaternion group	4	5	8	8	2	?
elementary abelian group:E8	5	1	6	8 (at most)	3	?

Numerical invariants

Group properties

Classification and families

Up to isoclinism

Up to the relation of being isoclinic, there are two equivalence classes:

Description of equivalence class	Members	Hall-Senior name	Second parts of IDs of members
abelian groups of order eight	cyclic group:Z8, direct product of Z4 and Z2, elementary abelian group:E8	${\displaystyle 8\Gamma _{1}}$	1,2,5
non-abelian groups of order eight	dihedral group:D8, quaternion group	${\displaystyle 8\Gamma _{2}}$	3,4

Up to Hall-Senior genus

Up to the relation of groups having the same Hall-Senior genus, there are four equivalence classes:

Description of equivalence class	Members	Hall-Senior name	Hall-Senior numbers	Second parts of GAP ID of members
Cyclic group	cyclic group:Z8	${\displaystyle (3)}$	3	1
Abelian group for partition ${\displaystyle 3=2+1}$	direct product of Z4 and Z2	${\displaystyle (21)}$	2	2
Non-abelian groups	dihedral group:D8, quaternion group	${\displaystyle 8\Gamma _{2}a}$ (the dihedral group is ${\displaystyle 8\Gamma _{2}a_{1}}$ and the quaternion group is ${\displaystyle 8\Gamma _{2}a_{2}}$)	4,5	3,4
Elementary abelian group	elementary abelian group:E8	${\displaystyle (1^{3})}$	1	5

Element structure

Order statistics

FACTS TO CHECK AGAINST:

ORDER STATISTICS (cf. order statistics, order statistics-equivalent finite groups): number of nth roots is a multiple of n | Finite abelian groups with the same order statistics are isomorphic | Lazard Lie group has the same order statistics as the additive group of its Lazard Lie ring | Frobenius conjecture on nth roots

1-ISOMORPHISM (cf. 1-isomorphic groups): Lazard Lie group is 1-isomorphic to the additive group of its Lazard Lie ring | order statistics-equivalent not implies 1-isomorphic

Here are the statistics for a particular order.

Here are the number of ${\displaystyle n^{th}}$ root statistics. The number of ${\displaystyle n^{th}}$ roots equals the number of elements whose order divides ${\displaystyle n}$.

Group	Second part of GAP ID	Hall-Senior number	Number of first roots	Number of ${\displaystyle 2^{nd}}$ roots	Number of ${\displaystyle 4^{th}}$ roots	Number of ${\displaystyle 8^{th}}$ roots
cyclic group:Z8	1	3	1	2	4	8
direct product of Z4 and Z2	2	2	1	4	8	8
dihedral group:D8	3	4	1	6	8	8
quaternion group	4	5	1	2	8	8
elementary abelian group:E8	5	1	1	8	8	8

Equivalence classes

No two of the groups of order 8 are order statistics-equivalent, and hence no two of them are 1-isomorphic.

Subgroup structure

Detailed information

Number of subgroups per isomorphism type

The number in each column is the number of subgroups in the given group of that isomorphism type:

Number of normal subgroups per isomorphism type

Number of subgroups of various kinds per order

Possibilities for maximal subgroups

Subgroup-defining functions

Values up to isomorphism type

Associated constructs