On the properties SOP2n+1+1

Abstract

We show that approximations of strict order can calibrate the fine structure of genericity. Particularly, we find exponential behavior within the NSOPn hierarchy from model theory. Let 0--independence denote forking-independence. Inductively, a formula (n+1)--divides over M if it divides by every n--independent Morley sequence over M, and (n+1)--forks over M if it implies a disjunction of formulas that (n+1)--divide over M; the associated independence relation over models is called (n+1)--independence. We show that a theory where n--independence is symmetric or transitive must be NSOP2n+1+1. We then show that, in the classical examples of NSOP2n+1+1 theories, n--independence is symmetric and transitive; in particular, there are strictly NSOP2n+1+1 theories where n--independence is symmetric and transitive, leaving open the question of whether symmetry or transitivity of n--independence is equivalent to NSOP2n+1+1.