Tracking chains revisited

Abstract

The structure C2:=(1∞,,1,2), introduced and first analyzed in Carlson and Wilken 2012 (APAL), is shown to be elementary recursive. Here, 1∞ denotes the proof-theoretic ordinal of the fragment 11-CA0 of second order number theory, or equivalently the set theory KPl0, which axiomatizes limits of models of Kripke-Platek set theory with infinity. The partial orderings 1 and 2 denote the relations of 1- and 2-elementary substructure, respectively. In a subsequent article we will show that the structure C2 comprises the core of the structure R2 of pure elementary patterns of resemblance of order 2. In Carlson and Wilken 2012 (APAL) the stage has been set by showing that the least ordinal containing a cover of each pure pattern of order 2 is 1∞. However, it is not obvious from Carlson and Wilken 2012 (APAL) that C2 is an elementary recursive structure. This is shown here through a considerable disentanglement in the description of connectivity components of 1 and 2. The key to and starting point of our analysis is the apparatus of ordinal arithmetic developed in Wilken 2007 (APAL) and in Section 5 of Carlson and Wilken 2012 (JSL), which was enhanced in Carlson and Wilken 2012 (APAL) specifically for the analysis of C2.