TY - JOUR

T1 - Ordered onepoint-compactifications, stably continuous frames and tensors

AU - Erné, M.

AU - Reinhold, J.

PY - 1999/3/1

Y1 - 1999/3/1

N2 - We investigate the structure of semilattices K 0 (X) of all ordered compactifications of ordered topological spaces X with a one-point Nachbin-compactification. These semilattices and their isomorphic copies are called oc l-semilattices. We give an abstract characterization of all oc l-lattices by means of certain generalized stably continuous frames. A finite ordered set is shown to be a dual oc l-semilattice iff it is a distributive tensor, that is, a 2-consistently complete meet-semilattice T whose principal ideals are distributive and which contains two disjoint elements t o, t 1 such that s = (t o and s) V (t 1 ∧ s) for all s ∈ T. More generally, we characterize those dual oc l-semilattices which are finite unions of principal ideals.

AB - We investigate the structure of semilattices K 0 (X) of all ordered compactifications of ordered topological spaces X with a one-point Nachbin-compactification. These semilattices and their isomorphic copies are called oc l-semilattices. We give an abstract characterization of all oc l-lattices by means of certain generalized stably continuous frames. A finite ordered set is shown to be a dual oc l-semilattice iff it is a distributive tensor, that is, a 2-consistently complete meet-semilattice T whose principal ideals are distributive and which contains two disjoint elements t o, t 1 such that s = (t o and s) V (t 1 ∧ s) for all s ∈ T. More generally, we characterize those dual oc l-semilattices which are finite unions of principal ideals.

UR - http://www.scopus.com/inward/record.url?scp=80255133755&partnerID=8YFLogxK

U2 - 10.1080/16073606.1999.9632059

DO - 10.1080/16073606.1999.9632059

M3 - Article

AN - SCOPUS:80255133755

VL - 22

SP - 63

EP - 81

JO - Quaestiones mathematicae

JF - Quaestiones mathematicae

SN - 1607-3606

IS - 1

ER -