Transfinite hypercentral iterated wreath product of integral domains

Abstract

Starting with an integral domain D of characteristic 0, we consider a class of iterated wreath product Wn of n copies of D. In order that Wn be transfinite hypercentral, it is necessary to restrict to the case of wreath products defined by way of numerical polynomials. We also associate to each of these groups a Lie ring, providing a correspondence preserving most of the structure. This construction generalizes a result of netreba which characterizes the Lie algebras associated to the Sylow \(p\)-subgroups of the symmetric group \((pn)\). As an application, we explore the normalizer chain Nii≥ -1 starting from the canonical regular abelian subgroup T of Wn. Finally, we characterize the regular abelian normal subgroups of N0 that are isomorphic to Dn.

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