Superclasses in a Finite Extension of Zermelo Set Theory

## Abstract An interesting positive theory is the GPK theory. The models of this theory include all hyperuniverses (see [5] for a definition of these ones). Here we add a form of the axiom of infinity and a new scheme to obtain GPK~∞~^+^. We show that in these conditions, we can interprete the Kell

We consider the random poset P(n, p) which is generated by first selecting each subset of [n]=[1, ..., n] with probability p and then ordering the selected subsets by inclusion. We give asymptotic estimates of the size of the maximum antichain for arbitrary p= p(n). In particular, we prove that if p

We give an upper bound for the number of conjugacy classes of closed subgroups of the full wreath product FWr W Sym which project onto Sym . Here, is infinite, W is the set of n-tuples of distinct elements from (for some finite n), F is a finite nilpotent group, and the topology on the wreath produc