On the closure of the extended bicyclic semigroup

Abstract

In the paper we study the semigroup CZ which is a generalization of the bicyclic semigroup. We describe main algebraic properties of the semigroup CZ and prove that every non-trivial congruence C on the semigroup CZ is a group congruence, and moreover the quotient semigroup CZ/C is isomorphic to a cyclic group. Also we show that the semigroup CZ as a Hausdorff semitopological semigroup admits only the discrete topology. Next we study the closure clT(CZ) of the semigroup CZ in a topological semigroup T. We show that the non-empty remainder of CZ in a topological inverse semigroup T consists of a group of units H(1T) of T and a two-sided ideal I of T in the case when H(1T)≠ and I≠. In the case when T is a locally compact topological inverse semigroup and I≠ we prove that an ideal I is topologically isomorphic to the discrete additive group of integers and describe the topology on the subsemigroup CZ I. Also we show that if the group of units H(1T) of the semigroup T is non-empty, then H(1T) is either singleton or H(1T) is topologically isomorphic to the discrete additive group of integers.