Raney extensions: a pointfree theory of T0 spaces based on canonical extension

Abstract

We introduce a pointfree version of Raney duality. Our objects are Raney extensions of frames, pairs (L,C) where C is a coframe and L⊂eq C is a subframe that meet-generates it and whose embedding preserves strongly exact meets. We show that there is a dual adjunction between Raney and Top, with all T0 spaces as fixpoints, assigning to a space X the pair ((X),U(X)), with U(X) are the intersections of open sets. We show that for every Raney extension (L,C) there are subcolocale inclusions Sc(L)op⊂eq C⊂eq So(L) where these are the opposite of the frame of joins of closed sublocales and the coframe of intersections of open sublocales. We thus exhibit a symmetry between these two well-studied structures in pointfree topology. The spectra of these are, respectively, the classical spectrum pt(L) of the underlying frame and its TD spectrum ptD(L). This confirms the view advanced in banaschewskitd that sobriety and the TD property are mirror images of each other, and suggests that the symmetry above is a pointfree view of it. All Raney extensions satisfy some variation of the properties density and compactness from the theory of canonical extensions. We characterize sobriety, the T1, and the TD axioms in terms of density and compactness of ((X),U(X)). We characterize frame morphisms f:L M that extend to Raney morphisms f:(L,C) (M,D). We use this result to exhibit the existence of various free and cofree constructions. We use Raney extensions to give a new perspective on canonical extension generalized to frames as well as TD duality.

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