Difference between revisions of "Generic classifications by p-group class"

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(Mcbssce moved page Generic classifications by p-group class to Results on classes of groups over redirect: revert)
 
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#REDIRECT [[Results on classes of groups]]
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This page will contain results for generic classes of ''p''-groups. It is very much under construction so the list below is not complete.
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== Cyclic ''p''-groups ==
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Morita equivalence classes are labelled by [[Brauer trees]], but it is at present an open problem as to which Brauer trees are realised by blocks of finite groups. Each ''k''-Morita equivalence class corresponds to an unique <math>\mathcal{O}</math>-Morita equivalence class.
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== Tame blocks ==
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Erdmann classified algebras which are candidates for [[Basic algebras|basic algebras]] of tame blocks, i.e., those with dihedral, semidihedral or generalised quaternion defect groups (see [[References|[Er90] ]]) and in the cases of dihedral and semihedral defect groups determined which are realised by blocks of finite groups. In the case of generalised quaternion groups, the case of blocks with two simple modules is still open. These classifications only hold with respect to the field ''k'' at present.
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== Abelian ''2''-groups with ''2''-rank at most three ==
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These have been classified in [[References|[WZZ18] ]] and [[References|[EL18a] ]] with respect to <math>\mathcal{O}</math>.
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== Abelian ''2''-groups ==
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Donovan's conjecture holds for ''2''-blocks with abelian defect groups. Some generic classification results are known for certain inertial quotients. These will be detailed here.

Revision as of 15:29, 5 September 2018

This page will contain results for generic classes of p-groups. It is very much under construction so the list below is not complete.

Cyclic p-groups

Morita equivalence classes are labelled by Brauer trees, but it is at present an open problem as to which Brauer trees are realised by blocks of finite groups. Each k-Morita equivalence class corresponds to an unique [math]\mathcal{O}[/math]-Morita equivalence class.

Tame blocks

Erdmann classified algebras which are candidates for basic algebras of tame blocks, i.e., those with dihedral, semidihedral or generalised quaternion defect groups (see [Er90] ) and in the cases of dihedral and semihedral defect groups determined which are realised by blocks of finite groups. In the case of generalised quaternion groups, the case of blocks with two simple modules is still open. These classifications only hold with respect to the field k at present.

Abelian 2-groups with 2-rank at most three

These have been classified in [WZZ18] and [EL18a] with respect to [math]\mathcal{O}[/math].

Abelian 2-groups

Donovan's conjecture holds for 2-blocks with abelian defect groups. Some generic classification results are known for certain inertial quotients. These will be detailed here.