A Note on Standard Topological Contexts with Pseudometric
نویسنده
چکیده
Standard topological contexts are a valuable tool in representing several classes of ordered algebraic structures. While investigating Contextual Topology, pseudometric contexts were introduced as a tool in approximating objects by their attributes. Here we describe the interaction between these two classes, i.e., pseudometric contexts and standard topological contexts, pointing out whether the Hartung duality extends in the case of metric lattices or not. Moreover, the meaning of being a contraction or being continuous in the case of multivalued pseudometric morphisms is investigated.
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تاریخ انتشار 2002