Abstract
SynopsisIn the publication [2] we obtained some structure theorems for certain Dubreil-Jacotin regular semigroups. A crucial observation in the course of investigating these types of ordered regular semigroups was that the (ordered) band of idempotents was normal. This is characteristic of a class of semigroups studied by Yamada [5] and called generalised inverse semigroups. Here we specialise a construction of Yamada to obtain a structure theorem that complements those in [2], The important feature of the present approach is the part played by the greatest elements that exist in each of the components in the semilattice decompositions involved.
Publisher
Cambridge University Press (CUP)
Cited by
5 articles.
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1. Abundant semigroups with a *-normal idempotent;Mathematica Slovaca;2017-07-14
2. Maximum idempotents in naturally ordered regular semigroups;Proceedings of the Edinburgh Mathematical Society;1983-06
3. Regular Rees matrix semigroups and regular Dubreil-Jacotin semigroups;Journal of the Australian Mathematical Society. Series A. Pure Mathematics and Statistics;1981-10
4. Split orthodox semigroups;Journal of Algebra;1978-04
5. Perfect Dubreil-Jacotin semigroups;Proceedings of the Royal Society of Edinburgh: Section A Mathematics;1977