Conjugacy classes of stabilizer subgroups












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Let $Gsubseteq GL(V)$ be a complex finite reflection group. I would like to understand the stabilizer subgroups of $G$, and their normalizers. By this I mean (the conjugacy classes of) subgroups $H<G$ such that there exists $vin V$ such that $Stab_G(v)=H$, together with $N_G(H)$.



Ideally there would be some table somewhere, with the poset of stabilizer subgroups. I was able to compute everything (rather painfully) when $dim(V)leq 3$ or when $G=G(n,m,p)$, so I am only missing the exceptional groups of rank at least $4$, that is 28-37 in this list (Shephard-Todd classification).



Alternatively, since I am also trying to learn to use Magma/Sage/GAP, I was wondering if there is a way to extract the information I need from these programs.










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    4














    Let $Gsubseteq GL(V)$ be a complex finite reflection group. I would like to understand the stabilizer subgroups of $G$, and their normalizers. By this I mean (the conjugacy classes of) subgroups $H<G$ such that there exists $vin V$ such that $Stab_G(v)=H$, together with $N_G(H)$.



    Ideally there would be some table somewhere, with the poset of stabilizer subgroups. I was able to compute everything (rather painfully) when $dim(V)leq 3$ or when $G=G(n,m,p)$, so I am only missing the exceptional groups of rank at least $4$, that is 28-37 in this list (Shephard-Todd classification).



    Alternatively, since I am also trying to learn to use Magma/Sage/GAP, I was wondering if there is a way to extract the information I need from these programs.










    share|cite|improve this question



























      4












      4








      4


      1





      Let $Gsubseteq GL(V)$ be a complex finite reflection group. I would like to understand the stabilizer subgroups of $G$, and their normalizers. By this I mean (the conjugacy classes of) subgroups $H<G$ such that there exists $vin V$ such that $Stab_G(v)=H$, together with $N_G(H)$.



      Ideally there would be some table somewhere, with the poset of stabilizer subgroups. I was able to compute everything (rather painfully) when $dim(V)leq 3$ or when $G=G(n,m,p)$, so I am only missing the exceptional groups of rank at least $4$, that is 28-37 in this list (Shephard-Todd classification).



      Alternatively, since I am also trying to learn to use Magma/Sage/GAP, I was wondering if there is a way to extract the information I need from these programs.










      share|cite|improve this question















      Let $Gsubseteq GL(V)$ be a complex finite reflection group. I would like to understand the stabilizer subgroups of $G$, and their normalizers. By this I mean (the conjugacy classes of) subgroups $H<G$ such that there exists $vin V$ such that $Stab_G(v)=H$, together with $N_G(H)$.



      Ideally there would be some table somewhere, with the poset of stabilizer subgroups. I was able to compute everything (rather painfully) when $dim(V)leq 3$ or when $G=G(n,m,p)$, so I am only missing the exceptional groups of rank at least $4$, that is 28-37 in this list (Shephard-Todd classification).



      Alternatively, since I am also trying to learn to use Magma/Sage/GAP, I was wondering if there is a way to extract the information I need from these programs.







      group-theory finite-groups gap reflection






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      edited Nov 30 at 18:25

























      asked Nov 30 at 8:38









      Cehiju

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