Baranga, Andrei \({\mathbf Z}\)-continuous posets, topological aspects. (English) Zbl 0883.06007 Stud. Cercet. Mat. 49, No. 1-2, 3-16 (1997). Summary: The concept of “subset system on the category Po of posets” (Z-sets) was defined by J. B. Wright, E. G. Wagner and J. W. Thatcher [Theor. Comput. Sci. 7, 57-77 (1978; Zbl 0732.06001)]. The term Z-set becomes meaningful if we replace Z by “directed”, “chain”, “finite”. At the end of the paper [loc. cit.], the authors suggested to try to study the generalized counterpart of the term “continuous poset (lattice)” obtained by replacing directed sets with Z-sets, Z being an arbitrary subset system on Po. We present here some results concerning this investigation. If the author’s earlier results [Discrete Math. 152, No. 1-3, 33-45 (1996; Zbl 0851.06003)] are generalized counterparts of some purely order facts about continuous posets, the present paper deals with a generalized counterpart of the Scott topology on posets and some results related to this concept. Cited in 2 Documents MSC: 06B35 Continuous lattices and posets, applications 06A15 Galois correspondences, closure operators (in relation to ordered sets) Keywords:subset system; \({\mathbf Z}\)-set; continuous posets Citations:Zbl 0732.06001; Zbl 0851.06003 PDFBibTeX XMLCite \textit{A. Baranga}, Stud. Cercet. Mat. 49, No. 1--2, 3--16 (1997; Zbl 0883.06007)