Minimal Constructibility deals with families of subsets of a given universe X. This construction involves finite unions, finite intersections and complements. Of course this is related to algebras. Separability (T_0) is a concept from topology that​ can be extended in our setting producing beautiful results involving partions of sets. Thats is when the term minimal constructibility becomes very exciting and interesting, there is no way we can stop about thinking of more and more possibilities. Yes, a constructible set is a generalization of the one found in Topology.