Nilpotent groups, solvable groups and factorizable inverse monoids

Abstract

In this paper subcentral (resp., central) idempotent series and composition subcentral (resp., central) idempotent series in an inverse semigroup are introduced and investigated. It is shown that if S=EG is a factorizable inverse monoids with semilattice E of idempotents and the group G of units such that the natural connection θ is a dual isomorphism from E to a sublattice of L(G), then any two composition subcentral (resp., central) idempotent series in S are isomorphic. It may be considered as an appropriate analogue in semigroup theory of Jordan-H\"older Theorem in group theory. Based on this,G-nilpotent and G-solvable inverse monoids are also introduced and studies. Some characterizations of the coset monoid of nilpotent groups and solvable groups are given. This extends the main result in Semigroup Forum 20: 255-267, 1980 and also provides another effective approach for the study of nilpotent and solvable groups. Finally, some open problems related to nilpotent and solvable groups are translated to semigroup theory, which may be helpful for us to solve these open problems.

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