Tychonoff Expansions with Prescribed Resolvability Properties

Abstract

The recent literature offers examples, specific and hand-crafted, of Tychonoff spaces (in ZFC) which respond negatively to these questions, due respectively to Ceder and Pearson (1967) and to Comfort and Garc\'ia-Ferreira (2001): (1) Is every ω-resolvable space maximally resolvable? (2) Is every maximally resolvable space extraresolvable? Now using the method of KID expansion, the authors show that every suitably restricted Tychonoff topological space (X,) admits a larger Tychonoff topology (that is, an "expansion") witnessing such failure. Specifically the authors show in ZFC that if (X,) is a maximally resolvable Tychonoff space with S(X,)≤(X,)=, then (X,) has Tychonoff expansions =i (1≤ i≤5), with (X,i)=(X,) and S(X,i)≤(X,i), such that (X,i) is: (i=1) ω-resolvable but not maximally resolvable; (i=2) [if ' is regular, with S(X,)≤'≤] τ-resolvable for all τ<', but not '-resolvable; (i=3) maximally resolvable, but not extraresolvable; (i=4) extraresolvable, but not maximally resolvable; (i=5) maximally resolvable and extraresolvable, but not strongly extraresolvable.