Some special congruences on completely regular semigroups
arXiv:1901.08776 · doi:10.1080/00927872.2018.1543427
Abstract
This paper enriches the list of properties of the congruence sequences starting from the universal relation and successively performing the operations of lower $t$ and lower $k$. Three classes of completely regular semigroups, namely semigroups for which $\kerÏ$ is a cryptogroup, semigroups for which $\kerν$ is a cryptogroup and semigroups for which $κ$ is over rectangular bands, are studied. $((Ï_t)_k)_t$, $((\mathcal{D}_t)_k)_t$ and $((Ï_k)_t)_k$ are found to be the least congruences on $S$ such that the quotient semigroups are semigroups for which $\kerÏ$ is a cryptogroup, $\kerν$ is a cryptogroup and $κ$ is over rectangular bands, respectively. The results obtained present a response to three problems in Petrich and Reilly's textbook \textquoteleft\textquoteleft Completely Regular Semigroups\textquoteright\textquoteright.