On mathscr{H}-complete topological semilattices
classification
🧮 math.GN
keywords
mathscrcompletesemilatticestopologicalcompletionsgivelambdamathbb
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In the paper we describe the structure of $\mathscr{AH}$-completions and $\mathscr{H}$-completions of the discrete semilattices $(\mathbb{N},\min)$ and $(\mathbb{N},\max)$. We give an example of an $\mathscr{H}$-complete topological semilattice which is not $\mathscr{AH}$-complete. Also we construct an $\mathscr{H}$-complete topological semilattice of cardinality $\lambda$ which has $2^\lambda$ many open-and-closed continuous homomorphic images which are not $\mathscr{H}$-complete topological semilattices. The constructed examples give a negative answer to Question 17 from the paper J. W. Stepp, {\it Algebraic maximal semilattices}. Pacific J. Math. {\bf 58}:1 (1975), 243-248.
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