Abstract
It was shown by Banaschewski and Pultr that the classical adjunction between Top and Loc restricts to an adjunction between the category Top D of TD -spaces and their continuous maps, and the category Loc D of all locales and localic maps which preserve coveredness of primes. Despite the fact that Loc D plays an important role in the TD -duality, not much is known about its categorical structure, and it is the aim of this paper to fill this gap. In particular, we show that Loc D is closed under finite products in Loc and moreover we characterize the existence of equalizers. As a consequence, it is proved that regular monomorphisms in Loc D are precisely the D-sublocales — the notion analogue to sublocale in the TD -duality — a situation akin to the standard fact that sublocales are precisely regular monomorphisms in Loc. The results are then applied to obtain the TD -analogues of some familiar results for sober spaces and some new characterizations of TD -spatiality of localic squares in terms of certain discrete covers of locales.
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