| الوصف: |
We draw from Raney duality and generalize the notion of canonical extension for distributive lattices to the context of frames. This is a generalization because for distributive lattices we are in the context of coherent spaces, whereas frames represent arbitrary spaces. We introduce Raney extensions of frames, pairs $(L,C)$ where $C$ is a coframe, $L\subseteq C$ is a frame that meet-generates it, and the inclusion $L\subseteq C$ preserves the frame operations as well as the strongly exact meets. We think of these as being algebraic versions of the embedding $\Omega(X)\subseteq \mathcal{U}(X)$ of a frame of opens into a lattice of saturated sets (upper sets in the specialization order). We show that a frame may have several Raney extensions, and all satisfy a generalization of the properties of density and compactness from the theory of canonical extensions. We show that every frame $L$ has the largest and the smallest Raney extension, and that these are, respectively, the coframe of fitted sublocales $\mathsf{S}_{\mathfrak{o}}(L)$ and the opposite of the frame $\mathsf{S}_{\mathfrak{c}}(L)$ of joins of closed sublocales. We thus show that these structures have universal properties which are dual of one another. For Raney extensions $(L,C)$ and $(M,D)$, we characterize the frame morphisms $f:L\to M$ which can be extended to a morphism of Raney extensions. We apply this result to obtain a characterization of morphisms of frames $f:L\to M$ which can be lifted to frame morphisms $\mathsf{S}_{\mathfrak{c}}(L)\to \mathsf{S}_{\mathfrak{c}}(M)$. We also show that the canonical extension of a locally compact frame is the free Raney extension over it such that it is algebraic (generated by its compact elements). We give a characterization of sobriety and of strict sobriety based on a variation of the compactness property of the extension $(\Omega(X),\mathcal{U}(X))$. |
