Difference between revisions of "C2xC2"
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== Blocks with defect group <math>C_2 \times C_2</math> == | == Blocks with defect group <math>C_2 \times C_2</math> == | ||
− | These are blocks are examples of [[Tame blocks|tame blocks]] and were first classified over <math>k</math> by Erdmann (see [Er82]). Linckelmann classified them over <math>\mathcal{O}</math> in [Li94], in which he also showed that the source algebras lie within three infinite families. In [CEKL11] the CFSG was used to show that only one source algebra can occur for each Morita equivalence class. | + | These are blocks are examples of [[Tame blocks|tame blocks]] and were first classified over <math>k</math> by Erdmann (see [[References|[Er82] ]]). Linckelmann classified them over <math>\mathcal{O}</math> in [[References|[Li94] ]], in which he also showed that the source algebras lie within three infinite families. In [[References|[CEKL11] ]] the CFSG was used to show that only one source algebra can occur for each Morita equivalence class. |
There are three <math>\mathcal{O}</math>-Morita equivalence classes. | There are three <math>\mathcal{O}</math>-Morita equivalence classes. |
Revision as of 12:54, 28 August 2018
Blocks with defect group [math]C_2 \times C_2[/math]
These are blocks are examples of tame blocks and were first classified over [math]k[/math] by Erdmann (see [Er82] ). Linckelmann classified them over [math]\mathcal{O}[/math] in [Li94] , in which he also showed that the source algebras lie within three infinite families. In [CEKL11] the CFSG was used to show that only one source algebra can occur for each Morita equivalence class.
There are three [math]\mathcal{O}[/math]-Morita equivalence classes.
Class | Representative | [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 |
---|---|---|---|---|---|---|---|---|---|
[math]M(4,2,1)[/math] | [math]k(C_2 \times C_2)[/math] | 4 | 1 | [math]1[/math] | [math](C_2 \times C_2):S_3[/math] | [math](k \times k):GL_2(k)[/math] | 1 | 1 | |
[math]M(4,2,2)[/math] | [math]kA_4[/math] | 4 | 3 | [math]C_3[/math] | [math]S_3[/math] | [math](k^* \times k^* \times C_3):C_2[/math] | 1 | 1 | |
[math]M(4,2,3)[/math] | [math]B_0(kA_5)[/math] | 4 | 3 | [math]C_3[/math] | [math]C_2[/math] | [math](k^* \times k^*):C_2[/math] | 1 | 1 |