Gabriel topologies on coherent quantales Original Research Article

The set of Gabriel topologies on a coherent quantale ordered under inclusion is a frame (studied by Rosenthal, Simmons and others). The set of all those Gabriel topologies that are inaccessible by directed joins (we call such topologies compact) is a subframe of it. When the quantale under consideration is commutative the frame of compact topologies is coherent. Several notions of spectra in ring theory appear as instances of this construction. When the quantale is non-commutative and coherent and its finite elements are closed under (right) implication then the frame of compact topologies is locally compact and compact. We present an interpretation of the notion of compact Gabriel topology on a coherent quantale in terms of deductively closed sets of formulae for a system of prepositional logic without the contraction and possibly the exchange rule (but admitting weakening). Our local compactness (and the subsequent spatiality) results for the frame of compact topologies correspond to a completeness theorem for such a system.