Bounded generation for congruence subgroups of Sp4(R)
Abstract
This paper describes a bounded generation result concerning the minimal natural number K such that for Q(C2,2R):=\Aφ(2x)A-1|x∈ R,A∈ Sp4(R),φ∈ C2\, one has NC2,2R=\X1·s XK|∀ 1≤ i≤ K:Xi∈ Q(C2,2R)\ for rings of algebraic integers R and the principal congruence subgroup NC2,2R in Sp4(R). This gives an explicit version of an abstract bounded generation result of a similar type as presented by Morris. Furthermore, the result presented does not depend on several number-theoretic quantities unlike Morris' result. Using this bounded generation result, we further give explicit bounds for the strong boundedness of Sp4(R) for certain examples of rings R, thereby giving explicit versions of results in an earlier paper. We further give a classification of normally generating subsets of Sp4(R) for R a ring of algebraic integers.
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