A family of groups extending McLain's

Abstract

Given a strict partial order on a set and an arbitrary ring R with 1≠ 0, the corresponding McLain group M() has been studied in depth. We construct a larger family of McLain groups G(), where is neither asymmetric nor transitive, while satisfying two weaker axioms. Structural properties common to all members~G() of this new family are investigated, including a group presentation, a description of the factors of its descending central series, a canonical form for its elements relative to any total order on~, and a recursive determination of its upper central series. In addition, we prove the natural isomorphism G()/G() G(), where is a normal subset of , and G() and G() are extended McLain groups on their own right. This result has no parallel in the classical context.