A complete Heyting algebra whose Scott space is non-sober

Abstract

We prove that (1) for any complete lattice L, the set D(L) of all nonempty saturated compact subsets of the Scott space of L is a complete Heyting algebra (with the reverse inclusion order); and (2) if the Scott space of a complete lattice L is non-sober, then the Scott space of D(L) is non-sober. Using these results and the Isbell's example of a non-sober complete lattice, we deduce that there is a complete Heyting algebra whose Scott space is non-sober, thus give a positive answer to a problem posed by Jung. We will also prove that a T0 space is well-filtered iff its upper space (the set D(X) of all nonempty saturated compact subsets of X equipped with the upper Vietoris topology) is well-filtered, which answers another open problem.