The Fischer-Cliford Matrices and Character Table of the Split Extension Group 𝟐 𝟓 : 𝑺𝑳(𝟓, 𝟐)
نویسندگان
چکیده
منابع مشابه
On the Fischer-Clifford matrices of the non-split extension $2^6{{}^{cdot}}G_2(2)$
The group $2^6{{}^{cdot}} G_2(2)$ is a maximal subgroup of the Rudvalis group $Ru$ of index 188500 and has order 774144 = $2^{12}.3^3.7$. In this paper, we construct the character table of the group $2^6{{}^{cdot}} G_2(2)$ by using the technique of Fischer-Clifford matrices.
متن کاملThe Fischer-Clifford matrices and character table of the maximal subgroup $2^9{:}(L_3(4){:}S_3)$ of $U_6(2){:}S_3$
The full automorphism group of $U_6(2)$ is a group of the form $U_6(2){:}S_3$. The group $U_6(2){:}S_3$ has a maximal subgroup $2^9{:}(L_3(4){:}S_3)$ of order 61931520. In the present paper, we determine the Fischer-Clifford matrices (which are not known yet) and hence compute the character table of the split extension $2^9{:}(L_3(4){:}S_3)$.
متن کاملthe fischer-clifford matrices of an extension group of the form 2^7:(2^5:s_6)
the split extension group $a(4)cong 2^7{:}sp_6(2)$ is the affine subgroup of the symplectic group $sp_8(2)$ of index $255$. in this paper, we use the technique of the fischer-clifford matrices to construct the character table of the inertia group $2^7{:}(2^5{:}s_{6})$ of $a(4)$ of index $63$.
متن کاملon the fischer-clifford matrices of the non-split extension $2^6{{}^{cdot}}g_2(2)$
the group $2^6{{}^{cdot}} g_2(2)$ is a maximal subgroup of the rudvalis group $ru$ of index 188500 and has order 774144 = $2^{12}.3^3.7$. in this paper, we construct the character table of the group $2^6{{}^{cdot}} g_2(2)$ by using the technique of fischer-clifford matrices.
متن کاملthe fischer-clifford matrices and character table of the maximal subgroup $2^9{:}(l_3(4){:}s_3)$ of $u_6(2){:}s_3$
the full automorphism group of $u_6(2)$ is a group of the form $u_6(2){:}s_3$. the group $u_6(2){:}s_3$ has a maximal subgroup $2^9{:}(l_3(4){:}s_3)$ of order 61931520. in the present paper, we determine the fischer-clifford matrices (which are not known yet) and hence compute the character table of the split extension $2^9{:}(l_3(4){:}s_3)$.
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ژورنال
عنوان ژورنال: General Letters in Mathematics
سال: 2018
ISSN: 2519-9269,2519-9277
DOI: 10.31559/glm2018.4.1.4