A combinatorial characterization of Kim's lemma for pairs of bi-invariant types

Abstract

We give a combinatorial consistency-inconsistency configuration that is equivalent to the failure of the following form of Kim's lemma for a given k: () For any set of parameters A, formula (x,b), and A-bi-invariant types p and q extending tp(b/A), if (x,b) k-divides along p, then it divides along q. We then give an equivalent technical variant of () that is non-trivial over arbitrary invariance bases. We also show that the failure of weaker versions of () entails the existence of stronger combinatorial configurations, the strongest of which can be phrased in terms of families of parameters indexed by arbitrary cographs (i.e., P4-free graphs). Finally, we show that if there is an array (bi,j : i,j < ω) of parameters such that \(x,bi,j) : (i,j) ∈ C\ is consistent whenever C ⊂eq ω2 is a chain (in the product partial order) and k-inconsistent whenever C is an antichain, then there is a model M, parameter b, and M-coheirs p,q ⊃ tp(b/M) such that q ω is an M-heir-coheir and (x,b) k-divides along p but does not divide along q. In doing so, we also show that this configuration entails the failure of generic stationary local character under the assumption of GCH.