Difference between revisions of "Q16"
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|[[M(16,9,1)]] || <math>kSD_{16}</math> || 1 ||7 ||1 ||<math>1</math> || || || ||1 || | |[[M(16,9,1)]] || <math>kSD_{16}</math> || 1 ||7 ||1 ||<math>1</math> || || || ||1 || | ||
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| − | |[[M(16,9,2)]] || <math>B_0(k \tilde{S}_5)</math> || ? ||8 ||2 ||<math>1</math> || || || ||1 || <math>Q(2 {\cal A})</math> | + | |[[M(16,9,2)]] || <math>B_0(k \tilde{S}_5)</math><ref>This is the double cover SmallGroup(240,89)</ref> || ? ||8 ||2 ||<math>1</math> || || || ||1 || <math>Q(2 {\cal A})</math> |
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| − | |[[M(16,9,3)]] || <math>B_0(k \tilde{S}_4)</math> || ? ||8 ||2 ||<math>1</math> || || || ||1 || <math>Q(2 {\cal B})_1</math> | + | |[[M(16,9,3)]] || <math>B_0(k \tilde{S}_4)</math><ref>This is the double cover SmallGroup(48,28)</ref> || ? ||8 ||2 ||<math>1</math> || || || ||1 || <math>Q(2 {\cal B})_1</math> |
|- | |- | ||
|[[M(16,9,4)]] || <math>B_0(kSL_2(9))</math> || 1 ||9 ||3 ||<math>1</math> || || || ||1 || <math>Q(3 {\cal A})_2</math> | |[[M(16,9,4)]] || <math>B_0(kSL_2(9))</math> || 1 ||9 ||3 ||<math>1</math> || || || ||1 || <math>Q(3 {\cal A})_2</math> | ||
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| − | + | [[M(16,9,2)]] and [[M(16,9,3)]] are derived equivalent over <math>k</math> by [[References|[Ho97]]], in which it is further proved that ''all'' blocks with defect group <math>Q_{16}</math> and two simple modules are derived equivalent (irrespective of the unknown cases in the classification). | |
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| + | [[M(16,9,4)]], [[M(16,9,5)]] and [[M(16,9,6)]] are derived equivalent over <math>\mathcal{O}</math> by [[References|[Ei16]]]<ref>This result was obtained over <math>k</math> in [[References|[Ho97]]]</ref>. | ||
| − | + | == Notes == | |
| − | + | <references /> | |
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Latest revision as of 11:43, 26 November 2018
Blocks with defect group [math]Q_{16}[/math]
These are examples of tame blocks and were first classified over [math]k[/math] by Erdmann (see [Er88a], [Er88b]) with some exceptions. It is not known which algebras in the infinite families [math]Q(2 {\cal A})[/math] and [math]Q(2 {\cal B})_1[/math] are realised by blocks, and as such Donovan's conjecture is still open for [math]Q_{16}[/math] for blocks with two simple modules. Until this is resolved the labelling is provisional.
For blocks with three simple modules the [math]k[/math]-Morita equivalence classes lift to unique [math]\mathcal{O}[/math]-classes by [Ei16], but otherwise the classification with respect to [math]\mathcal{O}[/math] is still unknown.
CLASSIFICATION INCOMPLETE
| Class | Representative | # lifts / [math]\mathcal{O}[/math] | [math]k(B)[/math] | [math]l(B)[/math] | Inertial quotients | [math]{\rm Pic}_\mathcal{O}(B)[/math] | [math]{\rm Pic}_k(B)[/math] | [math]{\rm mf_\mathcal{O}(B)}[/math] | [math]{\rm mf_k(B)}[/math] | Notes |
|---|---|---|---|---|---|---|---|---|---|---|
| M(16,9,1) | [math]kSD_{16}[/math] | 1 | 7 | 1 | [math]1[/math] | 1 | ||||
| M(16,9,2) | [math]B_0(k \tilde{S}_5)[/math][1] | ? | 8 | 2 | [math]1[/math] | 1 | [math]Q(2 {\cal A})[/math] | |||
| M(16,9,3) | [math]B_0(k \tilde{S}_4)[/math][2] | ? | 8 | 2 | [math]1[/math] | 1 | [math]Q(2 {\cal B})_1[/math] | |||
| M(16,9,4) | [math]B_0(kSL_2(9))[/math] | 1 | 9 | 3 | [math]1[/math] | 1 | [math]Q(3 {\cal A})_2[/math] | |||
| M(16,9,5) | [math]B_0(k(2.A_7))[/math] | 1 | 10 | 3 | [math]1[/math] | 1 | [math]Q(3 {\cal B})[/math] | |||
| M(16,9,6) | [math]B_0(kSL_2(7))[/math] | 1 | 9 | 3 | [math]1[/math] | 1 | [math]Q(3 {\cal K})[/math] |
M(16,9,2) and M(16,9,3) are derived equivalent over [math]k[/math] by [Ho97], in which it is further proved that all blocks with defect group [math]Q_{16}[/math] and two simple modules are derived equivalent (irrespective of the unknown cases in the classification).
M(16,9,4), M(16,9,5) and M(16,9,6) are derived equivalent over [math]\mathcal{O}[/math] by [Ei16][3].
