Skew compact semigroups

• Published in: Applied general topology Vol. 4; no. 1; pp. 133 - 142
• Main Authors: Kopperman, Ralph D., Robbie, Desmond
• Format: Journal Article
• Language: English
• Published: Universitat Politècnica de València 01.04.2003
• Subjects: Continuity space; de Groot (cocompact) dual; de Groot map; de Groot skew compact semigroup; Order-Hausdorff space; Saturated set; Skew compact space; Specialization order of a topology
• ISSN: 1576-9402; 1989-4147
• DOI: 10.4995/agt.2003.2015

Skew compact spaces are the best behaving generalization of compact Hausdorff spaces to non-Hausdorff spaces. They are those (X ; τ ) such that there is another topology τ* on X for which τ V τ* is compact and (X; τ ; τ*) is pairwise Hausdorff; under these conditions, τ uniquely determines τ *, and (X; τ*) is also skew compact. Much of the theory of compact T2 semigroups extends to this wider class. We show: A continuous skew compact semigroup is a semigroup with skew compact topology τ, such that the semigroup operation is continuous τ2→ τ. Each of these contains a unique minimal ideal which is an upper set with respect to the specialization order. A skew compact semigroup which is a continuous semigroup with respect to both topologies is called a de Groot semigroup. Given one of these, we show: It is a compact Hausdorff group if either the operation is cancellative, or there is a unique idempotent and S2 = S. Its topology arises from its subinvariant quasimetrics. Each *-closed ideal ≠ S is contained in a proper open ideal.