English

Monoid varieties with extreme properties

Group Theory 2018-01-22 v4

Abstract

Finite monoids that generate monoid varieties with uncountably many subvarieties seem rare, and surprisingly, no finite monoid is known to generate a monoid variety with countably infinitely many subvarieties. In the present article, it is shown that there are, nevertheless, many finite monoids that generate monoid varieties with continuum many subvarieties; these include any finite inherently non-finitely based monoid and any monoid for which xyxyxyxy is an isoterm. It follows that the join of two Cross monoid varieties can have a continuum cardinality subvariety lattice that violates the ascending chain condition. Regarding monoid varieties with countably infinitely many subvarieties, the first example of a finite monoid that generates such a variety is exhibited. A complete description of the subvariety lattice of this variety is given. This lattice has width three and contains only finitely based varieties, all except two of which are Cross.

Keywords

Cite

@article{arxiv.1511.08239,
  title  = {Monoid varieties with extreme properties},
  author = {Marcel Jackson and Edmond W. H. Lee},
  journal= {arXiv preprint arXiv:1511.08239},
  year   = {2018}
}
R2 v1 2026-06-22T11:54:31.223Z