On separability finiteness conditions in semigroups
Abstract
Taking residual finiteness as a starting point, we consider three related finiteness properties: weak subsemigroup separability, strong subsemigroup separability and complete separability. We investigate whether each of these properties is inherited by Sch\"utzenberger groups. The main result of this paper states that for a finitely generated commutative semigroup , these three separability conditions coincide and are equivalent to every -class of being finite. We also provide examples to show that these properties in general differ for commutative semigroups and finitely generated semigroups. For a semigroup with finitely many -classes, we investigate whether it has one of these properties if and only if all its Sch\"utzenberger groups have the property.
Cite
@article{arxiv.2006.08499,
title = {On separability finiteness conditions in semigroups},
author = {Craig Miller and Gerard O'Reilly and Martyn Quick and Nik Ruskuc},
journal= {arXiv preprint arXiv:2006.08499},
year = {2021}
}
Comments
27 pages