In the theory of congruence subgroups, one usually shows that, under suitable assumptions, the normal closure of the mth power of an elementary unipotent matrix coincides with the full con- gruence subgroup mod m. For applications, it is sometimes useful to study the subgroup generated by the mth powers of the elementary unipotent elements. We give an elementary proof for the fact that in $SL_n(Z)$ for $n > 3$, this subgroup is normal in a suitably defined congruence subgroup of $SL_n(Z)$
summary:Let $N$ be a normal subgroup of a group $G$. The structure of $N$ is given when the $G$-conj...
The residual closure of a subgroup H of a group G is the intersection of all virtually normal subgro...
Abstract. This is a short survey of the progress on the congruence subgroup problem since the sixtie...
Mennicke J. A Remark on the Congruence Subgroup Problem. Mathematica Scandinavica. 2000;86(2):206-22...
this paper, and it is the other spot in the proof of Theorem 1.1 which depends on (CSG) (note that h...
We show that there is a uniform bound for the numbers of generators for all principal congruence sub...
investigation of the congruence subgroup problem for arbitrary semi-simple alge-braic groups. The ai...
AbstractLet D be a Dedekind ring. For a large class of subgroups S of SLn(D) (which includes, for ex...
We obtain a number of analogues of the classical results of the 1960s on the general linear groups G...
AbstractA complete description of the lattice of all normal subgroups not contained in the stabilize...
In its classical setting, the Congruence Subgroup Problem (CSP) asks whether every finite index subg...
In two previous papers we computed cohomology groups for a range of levels , where is the congru...
Spectral bounds on Maass forms of congruence families in algebraic groups are important ingredients ...
AbstractLet N>1 be an integer, and let Γ=Γ0(N)⊂SL4(Z) be the subgroup of matrices with bottom row co...
Let N\u3e1 be an integer, and let Γ=Γ0(N)SL4( ) be the subgroup of matrices with bottom row congruen...
summary:Let $N$ be a normal subgroup of a group $G$. The structure of $N$ is given when the $G$-conj...
The residual closure of a subgroup H of a group G is the intersection of all virtually normal subgro...
Abstract. This is a short survey of the progress on the congruence subgroup problem since the sixtie...
Mennicke J. A Remark on the Congruence Subgroup Problem. Mathematica Scandinavica. 2000;86(2):206-22...
this paper, and it is the other spot in the proof of Theorem 1.1 which depends on (CSG) (note that h...
We show that there is a uniform bound for the numbers of generators for all principal congruence sub...
investigation of the congruence subgroup problem for arbitrary semi-simple alge-braic groups. The ai...
AbstractLet D be a Dedekind ring. For a large class of subgroups S of SLn(D) (which includes, for ex...
We obtain a number of analogues of the classical results of the 1960s on the general linear groups G...
AbstractA complete description of the lattice of all normal subgroups not contained in the stabilize...
In its classical setting, the Congruence Subgroup Problem (CSP) asks whether every finite index subg...
In two previous papers we computed cohomology groups for a range of levels , where is the congru...
Spectral bounds on Maass forms of congruence families in algebraic groups are important ingredients ...
AbstractLet N>1 be an integer, and let Γ=Γ0(N)⊂SL4(Z) be the subgroup of matrices with bottom row co...
Let N\u3e1 be an integer, and let Γ=Γ0(N)SL4( ) be the subgroup of matrices with bottom row congruen...
summary:Let $N$ be a normal subgroup of a group $G$. The structure of $N$ is given when the $G$-conj...
The residual closure of a subgroup H of a group G is the intersection of all virtually normal subgro...
Abstract. This is a short survey of the progress on the congruence subgroup problem since the sixtie...
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