We will show that there is an infinite chain of small subcategories of the category Top₀, whose Kan-injective hulls are KZ-reflective subcategories of Top₀. Moreover, the union of this collection of KZ-reflective subcategories is the full and KZ-reflective subcategory of Top₀ which objects are the sober spaces, Sob.

By duality, we define the concepts of Kan-projectivity and co-KZ-reflectivity that we study in the category Frm. Here we show that the Kan-projective hulls of the images of the subcategories of A_n through the contra-variant functor \mathcal{O}:Top₀--->Frm, applying each topological space in the frame of the opens, are a chain of KZ-co-reflective subcategories of Frm. But their union is not contained in the subcategory of spatial lattices.