Abstract
In this paper, we research further into Z-predistributive and Z-precontinuous posets introduced by Erné. We focus on duality theorems based on the application of Galois connections whenever Z is a closed subset selection. For example, there is a duality between the categories Z-PDG and Z-PDD of all Z-predistributive posets with weakly Z△-continuous maps which have a lower adjoint, and maps preserve Z-below relation that have an upper adjoint, respectively, as morphisms. We introduce the concept of Z0-approximating auxiliary relation, and have made a slight improvement on Z-precontinuity, so that there is a generalization of the classical equivalence between domains and auxiliary relations.
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