Abstract
In this paper, it is proved that every special congruence subgroup SSp(V, I) of the symplectic group Sp(V (R)), where R is a ring of stable rank 1 with invertible element 2 and dim V (R) ≥ 4, is generated by the symplectic transvections belonging to this subgroup. This result is used to obtain the complete description of the normal subgroups of Sp(V (R)).
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