The interplay between weak topologies on topological semilattices

Abstract

We study the interplay between three weak topologies on a topological semilattice X: the weak topology WX (generated by the base consiting of open subsemilattices of X), the weak topology WX (generated by the subbase consisting of complements to closed subsemilattices), and the I-weak topology WX (which is the weakest topology in which all continuous homomorphisms h:X [0,1] remain continuous). Also we study the interplay between the weak topologies WX, WX, WX of a topological semilattice X and the Scott and Lawson topologies SX and LX, which are determined by the order structure of the semilattice. We prove that the weak topology W on a Hausdorff semitopological semilattice X is compact if and only if X is chain-compact in the sense that each closed chain in X is compact. This result implies that the Lawson topology LX on a semilattice X is compact if and only if X is a continuous semilattice if and only if X complete in the sense that each non-empty chain C in X has ∈f(C) and (C) in X. For a chain-compact Hausdorff topological semilattice X with topology TX we prove the inclusions WX⊂ LX⊂ WX⊂ TX. For a compact topological semilattice X we prove that TX= WX if and only if TX= LX if and only if TX= LX.