Group cohomology of quaternion group: Difference between revisions

This article gives specific information, namely, group cohomology, about a particular group, namely: quaternion group.
View group cohomology of particular groups | View other specific information about quaternion group

Homology groups for trivial group action

FACTS TO CHECK AGAINST (homology group for trivial group action):
First homology group: first homology group for trivial group action equals tensor product with abelianization
Second homology group: formula for second homology group for trivial group action in terms of Schur multiplier and abelianization|Hopf's formula for Schur multiplier
General: universal coefficients theorem for group homology|homology group for trivial group action commutes with direct product in second coordinate|Kunneth formula for group homology

Over the integers

The first few homology groups are given below:

${\displaystyle q}$	${\displaystyle 0}$	${\displaystyle 1}$	${\displaystyle 2}$	${\displaystyle 3}$	${\displaystyle 4}$	${\displaystyle 5}$	${\displaystyle 6}$	${\displaystyle 7}$
${\displaystyle H_{q}}$	${\displaystyle \mathbb {Z} }$	${\displaystyle \mathbb {Z} /2\mathbb {Z} \oplus \mathbb {Z} /2\mathbb {Z} }$	${\displaystyle 0}$	?	?	?	?	?

Over an abelian group

The first few homology groups with coefficients in an abelian group ${\displaystyle M}$ are given below:

${\displaystyle q}$	${\displaystyle 0}$	${\displaystyle 1}$	${\displaystyle 2}$	${\displaystyle 3}$	${\displaystyle 4}$	${\displaystyle 5}$	${\displaystyle 6}$	${\displaystyle 7}$
${\displaystyle H_{q}}$	${\displaystyle M}$	${\displaystyle M/2M\oplus M/2M}$	${\displaystyle \operatorname {Ann} _{M}(2)\oplus \operatorname {Ann} _{M}(2)}$	?	?	?	?	?

Cohomology groups for trivial group action

FACTS TO CHECK AGAINST (cohomology group for trivial group action):
First cohomology group: first cohomology group for trivial group action is naturally isomorphic to group of homomorphisms
Second cohomology group: formula for second cohomology group for trivial group action in terms of Schur multiplier and abelianization
In general: dual universal coefficients theorem for group cohomology relating cohomology with arbitrary coefficientsto homology with coefficients in the integers. |Cohomology group for trivial group action commutes with direct product in second coordinate | Kunneth formula for group cohomology

Over the integers

${\displaystyle q}$	${\displaystyle 0}$	${\displaystyle 1}$	${\displaystyle 2}$	${\displaystyle 3}$	${\displaystyle 4}$	${\displaystyle 5}$	${\displaystyle 6}$	${\displaystyle 7}$
${\displaystyle H^{q}}$	${\displaystyle \mathbb {Z} }$	0	${\displaystyle \mathbb {Z} /2\mathbb {Z} \oplus \mathbb {Z} /2\mathbb {Z} }$	${\displaystyle 0}$	?	?	?	?

Over an abelian group

The first few cohomology groups with coefficients in an abelian group ${\displaystyle M}$ are as follows:

${\displaystyle q}$	${\displaystyle 0}$	${\displaystyle 1}$	${\displaystyle 2}$	${\displaystyle 3}$	${\displaystyle 4}$	${\displaystyle 5}$	${\displaystyle 6}$	${\displaystyle 7}$
${\displaystyle H^{q}}$	${\displaystyle M}$	${\displaystyle \operatorname {Ann} _{M}(2)\oplus \operatorname {Ann} _{M}(2)}$	${\displaystyle M/2M\oplus M/2M}$	?	?	?	?	?

Cohomology ring with coefficients in integers

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Second cohomology groups and extensions

Schur multiplier

The Schur multiplier, defined as second cohomology group for trivial group action ${\displaystyle H^{2}(G,\mathbb {C} ^{\ast })}$, and also as the second homology group ${\displaystyle H_{2}(G;\mathbb {Z} )}$, is the trivial group.

Schur covering groups

Since the Schur multiplier is a trivial group, the Schur covering group of the quaternion group is the quaternion group itself.

Second cohomology groups for trivial group action