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Create the page "M(16,4,3)" on this wiki! See also the search results found.
- ...[[#F|F,]] [[#G|G,]] [[#H|H,]] [[#I|I,]] [[#J|J,]] [[#K|K,]] [[#L|L,]] [[#M|M,]] [[#N|N,]] [[#O|O,]] [[#P|P,]] [[#Q|Q,]] [[#R|R,]] [[#S|S,]] [[#T|T]] [[# |[AKO11] || '''M. Aschbacher, R. Kessar and B. Oliver''', ''Fusion systems in algebra and to21 KB (2,953 words) - 12:20, 9 January 2024
- |title = M(16,10,1) - <math>k(C_4 \times C_2 \times C_2)</math> |k(B) = 162 KB (256 words) - 09:41, 4 December 2018
- For <math>p=2,3</math> every appropriate Brauer tree is realised by a block and we can give [[C(3^n)|<math>3</math>-blocks with cyclic defect groups]]11 KB (1,772 words) - 12:15, 9 January 2024
- |title = M(8,2,1) - <math>k(C_4 \times C_2)</math> |image = M(4,2,1)quiver.png2 KB (187 words) - 12:33, 1 November 2018
- |title = M(8,5,3) - <math>k(A_4 \times C_2)</math> |image = M(8,5,3)quiver.png3 KB (344 words) - 22:07, 5 December 2018
- ...| 1 ||7 ||1 ||<math>1</math> || <math>C_7:C_6</math> || ||1 ||1 || [[Image:M(7,1,1)tree.png|45px]] ...|2 ||<math>C_2</math> || <math>C_2 \times C_3</math> || ||1 ||1 || [[Image:M(7,1,2)tree.png|45px]]4 KB (465 words) - 12:58, 22 November 2018
- == Blocks with basic algebras of dimension at most 16 == ...ale in [[References#B|[BS23]]] gave a classification for dimensions 15 and 16, except for one unsettled case of a block with defect group <math>C_{13}</m4 KB (528 words) - 14:33, 13 December 2023
- |title = M(8,5,7) - <math>B_0(kJ_1)</math> |image = M(8,5,7)quiver.png3 KB (241 words) - 10:10, 5 June 2019
- == Blocks with defect group <math>(C_2)^4</math> == ...] || <math>k((C_2)^4)</math> || 1 ||16 ||1 ||<math>1</math> || <math>(C_2)^4:GL_4(2)</math> || ||1 ||1 ||4 KB (524 words) - 18:39, 9 December 2019
- ...s C_4</math> is SmallGroup(96,195), which has isomorphism type <math>(C_2)^4:S_3</math>. |[[M(16,2,1)]] || <math>k(C_4 \times C_4)</math> || 1 ||16 ||1 ||<math>1</math> ||<math>(C_4 \times C_4):({\rm Aut}(C_4 \times C_4))</1 KB (167 words) - 08:13, 4 June 2019
- |title = M(16,2,2) - <math>k((C_4 \times C_4):C_3)</math> |image = M(4,2,3)quiver.png2 KB (237 words) - 10:57, 28 July 2019
- == Blocks with defect group <math>D_{16}</math> == ...to <math>\mathcal{O}</math> is still unknown. Note that the class <math>D(3 {\cal B})_1</math> is only realised for defect groups <math>D_8</math> (see2 KB (219 words) - 10:07, 5 October 2018
- ...ontain non-principal blocks. Some Picard groups calculated in [[References#M|[Mar]]]. ...s C_3)</math> || 1 ||9 ||1 ||<math>1</math> || <math>(C_3 \times C_3):GL_2(3)</math> || ||1 ||1 ||6 KB (781 words) - 10:45, 24 May 2022
- == Blocks with defect group <math>SD_{16}</math> == ...ive. It is not known whether there are blocks realising the class <math>SD(3 {\cal C})_2</math>.3 KB (385 words) - 14:34, 4 August 2022
- == Blocks with defect group <math>MNA(2,1)=\langle x,y|x^4=y^2=[x,y]^2=[x,[x,y]]=[y,[x,y]]=1 \rangle</math> == |[[M(16,3,1)]] || <math>k(MNA(2,1))</math> || 1 ||10 ||1 ||<math>1</math> || || ||1 |2 KB (255 words) - 12:47, 9 November 2022
- == Blocks with defect group <math>Q_{16}</math> == ...sed 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 labe3 KB (368 words) - 12:43, 26 November 2018
- |[[M(16,11,1)]] || <math>k(D_8 \times C_2)</math> || ? ||10 ||1 ||<math>1</math> || |[[M(16,11,2)]] || <math>B_0(k(PGL_2(5) \times C_2))</math> || ? ||10 ||2 ||<math>11 KB (196 words) - 12:21, 4 January 2019
- |[[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><ref>This is the double cover Smal2 KB (303 words) - 23:31, 15 August 2020
- |title = M(16,10,2) - <math>B_0(k(C_4 \times A_5))</math> |image = M(8,5,2)quiver.png2 KB (254 words) - 09:31, 5 December 2018
- |title = M(16,10,3) - <math>k(C_4 \times A_4)</math> |image = M(8,5,3)quiver.png2 KB (220 words) - 23:47, 18 December 2018
