The closedness of complete subsemilattices in functionally Hausdorff semitopological semilattices

Abstract

A topologized semilattice X is complete if each non-empty chain C⊂ X has ∈f C∈ C and C∈ C. It is proved that for any complete subsemilattice X of a functionally Hausdorff semitopological semilattice Y the partial order P=\(x,y)∈ X× X:xy=x\ of X is closed in Y× Y and hence X is closed in Y. This implies that for any continuous homomorphism h:X Y from a compete topologized semilattice X to a functionally Hausdorff semitopological semilattice Y the image h(X) is closed in Y. The functional Hausdorffness of Y in these two results can be replaced by the weaker separation axiom T2δ, defined in this paper.