Model Theory for a Compact Cardinal

Abstract

We like to develop model theory for T, a complete theory in Lθ,θ(τ) when θ is a compact cardinal. By [Sh:300a] we have bare bones stability and it seemed we can go no further. Dealing with ultrapowers (and ultraproducts) we restrict ourselves to ``D a θ-complete ultrafilter on I, probably (I,θ)-regular". The basic theorems work, but can we generalize deeper parts of model theory? In particular can we generalize stability enough to generalize [Sh:c, Ch.VI]? We prove that at least we can characterize the T's which are minimal under Keisler's order, i.e. such that \D:D is a regular ultrafilter on λ and M T ⇒ Mλ/D is λ-saturated\. Further we succeed to connect our investigation with the logic L1< θ introduced in [Sh:797]: two models are L1< θ-equivalent iff \, for some ω- sequence ofθ-complete ultrafilters, the iterated ultra-powers by it of those two models are isomorphic.