Quaternion group

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Definition

Definition by presentation

The quaternion group has the following presentation:

$⟨ i, j, k ∣ i^{2} = j^{2} = k^{2} = i j k ⟩$

The identity is denoted $1$ , the common element $i^{2} = j^{2} = k^{2} = i j k$ is denoted $- 1$ , and the elements $i^{3}, j^{3}, k^{3}$ are denoted $- i, - j, - k$ respectively.

Verbal definitions

The quaternion group is a group with eight elements, which can be described in any of the following ways:

It is the group comprising eight elements $1, - 1, i, - i, j, - j, k, - k$ where 1 is the identity element, $(- 1)^{2} = 1$ and all the other elements are squareroots of $- 1$ , such that $(- 1) i = - i, (- 1) j = - j, (- 1) k = - k$ and further, $i j = k, j i = - k, j k = i, k j = - i, k i = j, i k = - j$ (the remaining relations can be deduced from these).
It is the dicyclic group with parameter 2, viz $D i c_{2}$ .
It is the Fibonacci group $F (2, 3)$ .

Multiplication table

In the table below, the row element is multiplied on the left and the column element on the right.

Element	$1$	$- 1$	$i$	$- i$	$j$	$- j$	$k$	$- k$
$1$	$1$	$- 1$	$i$	$- i$	$j$	$- j$	$k$	$- k$
$- 1$	$- 1$	$1$	$- i$	$i$	$- j$	$j$	$- k$	$k$
$i$	$i$	$- i$	$- 1$	$1$	$k$	$- k$	$- j$	$j$
$- i$	$- i$	$i$	$1$	$- 1$	$- k$	$k$	$j$	$- j$
$j$	$j$	$- j$	$- k$	$k$	$- 1$	$1$	$i$	$- i$
$- j$	$- j$	$j$	$k$	$- k$	$1$	$- 1$	$- i$	$i$
$k$	$k$	$- k$	$j$	$- j$	$- i$	$i$	$- 1$	$1$
$- k$	$- k$	$k$	$- j$	$j$	$i$	$- i$	$1$	$- 1$

Position in classifications

Type of classification	Name in that classification
GAP ID	(8,4), i.e., the 4th among the groups of order 8
Hall-Senior number	5 among groups of order 8
Hall-Senior symbol	$8 Γ_{2} a_{2}$

Elements

Further information: Element structure of quaternion group

Conjugacy class structure

Conjugacy class	Size of conjugacy class	Order of elements in conjugacy class	Centralizer of first element of class
${1}$	1	1	whole group
${- 1}$	1	2	whole group
${i, - i}$	2	4	${1, - 1, i, - i}$ , same as $⟨ i ⟩$
${j, - j}$	2	4	${1, - 1, j, - j}$ -- same as $⟨ j ⟩$
${k, - k}$	2	4	${1, - 1, k, - k}$ -- same as $⟨ k ⟩$

Automorphism class structure

Equivalence class (orbit) under action of automorphisms	Size of equivalence class (orbit)	Number of conjugacy classes in it	Size of each conjugacy class	Order of elements
${1}$	1	1	1	1
${- 1}$	1	1	1	2
${i, - i, j, - j, k, - k}$	6	3	2	4

Arithmetic functions

Basic arithmetic functions

Want to compare and contrast arithmetic function values with other groups of the same order? Check out groups of order 8#Arithmetic functions

Function	Value	Similar groups	Explanation
underlying prime of p-group	2
order (number of elements, equivalently, cardinality or size of underlying set)	8	groups with same order
prime-base logarithm of order	3	groups with same prime-base logarithm of order
exponent of a group	4	groups with same order and exponent of a group \| groups with same exponent of a group	Cyclic subgroup of order four.
prime-base logarithm of exponent	2	groups with same order and prime-base logarithm of exponent \| groups with same prime-base logarithm of order and prime-base logarithm of exponent \| groups with same prime-base logarithm of exponent
nilpotency class	2	groups with same order and nilpotency class \| groups with same prime-base logarithm of order and nilpotency class \| groups with same nilpotency class
derived length	2	groups with same order and derived length \| groups with same prime-base logarithm of order and derived length \| groups with same derived length
Frattini length	2	groups with same order and Frattini length \| groups with same prime-base logarithm of order and Frattini length \| groups with same Frattini length
minimum size of generating set	2	groups with same order and minimum size of generating set \| groups with same prime-base logarithm of order and minimum size of generating set \| groups with same minimum size of generating set	Generators of two cyclic subgroups of order four.
subgroup rank of a group	2	groups with same order and subgroup rank of a group \| groups with same prime-base logarithm of order and subgroup rank of a group \| groups with same subgroup rank of a group	All proper subgroups are cyclic.
rank of a p-group	1	groups with same order and rank of a p-group \| groups with same prime-base logarithm of order and rank of a p-group \| groups with same rank of a p-group	All abelian subgroups are cyclic.
normal rank of a p-group	1	groups with same order and normal rank of a p-group \| groups with same prime-base logarithm of order and normal rank of a p-group \| groups with same normal rank of a p-group	All abelian normal subgroups are cyclic.
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