Stability of properties of locales under groups

Abstract

Given a particular collection of categorical axioms, aimed at capturing properties of the category of locales, we show that if C is a category that satisfies the axioms then so too is the category [ G, C] of G-objects, for any internal group G. To achieve this we prove a general categorical result: if an object S is double exponentiable in a category with finite products then so is its associated trivial G-object (S, π2: G × S → S). The result holds even if S is not exponentiable. An example is given of a category C that satisfies the axioms, but for which there is no elementary topos E such that C is the category of locales over E. It is shown, in outline, how the results can be extended from groups to groupoids.