Random ubiquitous transformation semigroups
Abstract
A smallest generating set of a semigroup is a generating set of the smallest cardinality. Similarly, an irredundant generating set is a generating set such that no proper subset of is also a generating set. A semigroup is ubiquitous if every irredundant generating set of is of the same cardinality. We are motivated by a na\"{i}ve algorithm to find a small generating set for a semigroup, which in practice often outputs a smallest generating set. We give a sufficient condition for a transformation semigroup to be ubiquitous and show that a transformation semigroup generated by randomly chosen transformations asymptoticly satisfies the sufficient condition. Finally, we show that under this condition the output of the previously mentioned na\"{i}ve algorithm is irredundant.
Cite
@article{arxiv.1705.05709,
title = {Random ubiquitous transformation semigroups},
author = {Julius Jonušas and Sascha Troscheit},
journal= {arXiv preprint arXiv:1705.05709},
year = {2019}
}
Comments
18 pages