Abstract
The logic Lθ1 was introduced in [She12]; it is the maximal logic below Lθ,θ in which a well ordering is not definable. We investigate it for θ a compact cardinal. We prove that it satisfies several parallels of classical theorems on first order logic, strengthening the thesis that it is a natural logic. In particular, two models are Lθ1-equivalent iff for some ω-sequence of θ-complete ultrafilters, the iterated ultrapowers by it of those two models are isomorphic. Also for strong limit λ>θ of cofinality ℵ, every complete Lθ1-theory has a so-called special model of cardinality λ, a parallel of saturated. For first order theory T and singular strong limit cardinal λ, T has a so-called special model of cardinality λ. Using “special” in our context is justified by: it is unique (fixing T and λ), all reducts of a special model are special too, so we have another proof of interpolation in this case.
| Original language | English |
|---|---|
| Pages (from-to) | 21-46 |
| Number of pages | 26 |
| Journal | Israel Journal of Mathematics |
| Volume | 246 |
| Issue number | 1 |
| DOIs | |
| State | Published - Dec 2021 |
Bibliographical note
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