Perfect congruences on bisimple ω-semigroups

Abstract

A congruence on a semigroup S is perfect if for any congruence classes x and y their product as subsets of S coincides (as a set) with the congruence class (xy). Perfect congruences on the bicyclic semigroup were found in key7. Using the structure of bisimple ω-semigroups determined in key25 and the description of congruences on these semigroups found in key20 and key1, we obtain a complete characterization of perfect congruences on all bisimple ω-semigroups, substantially generalizing the above mentioned result of key7.