Abstract

A pseudovariety of semigroups is join irreducible if, whenever it is contained in the complete join of some pseudovarieties, then it is contained in one of the pseudovarieties. A finite semigroup is join irreducible if it generates a join irreducible pseudovariety. New finite $\mathscr{J}$-trivial semigroups $\mathcal{C}\_n$ ($n \geq 2$) are exhibited with the property that, while each $\mathcal{C}\_n$ is not join irreducible, the monoid $\mathcal{C}\_n^I$ is join irreducible. The monoids $\mathcal{C}\_n^I$ are the first examples of join irreducible $\mathscr{J}$-trivial semigroups that generate pseudovarieties that are not self-dual. Several sufficient conditions are also established under which a finite semigroup is not join irreducible. Based on these results, join irreducible pseudovarieties generated by a $\mathscr{J}$-trivial semigroup of order up to six are completely described. It turns out that besides known examples and those generated by $\mathcal{C}\_2^I$ and its dual monoid, there are no further examples.

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