Maximal d-spectra and locally compact Hausdorff spaces

Abstract

It is an interesting open problem whether every compact Hausdorff space can be realized as the maximal d-spectrum of an arithmetic frame. We approach this problem by generalizing the d-nucleus to a stably continuous frame. We use Priestley duality to characterize the resulting d-nucleus, which allows us to prove that every locally compact Hausdorff space can be realized as the maximal d-spectrum of a continuous regular frame. As a corollary, we obtain that every locally Stone space can be realized as the maximal d-spectrum of an algebraic regular frame.