A Dedekind-style axiomatization and the corresponding universal property of an ordinal number system

Abstract: In this paper we give an axiomatization of the ordinal number system, in the style of Dedekind's axiomatization of the natural number system. The latter is based on a structure (N, 0, s) consisting of a set N , a distinguished element 0 ∈ N and a function s : N → N . The structure in our axiomatization is a triple (O, L, s), where O is a class, L is a function defined on all s-closed 'subsets' of O, and s is a class function s : O → O. In fact, we develop the theory relative to a Grothendieck-style universe (m… Show more