Chain Logic and Shelah's Infinitary Logic

Abstract

For a cardinal of the form =, Shelah's logic L1 has a characterisation as the maximal logic above λ< Lλ, ω satisfying Strong Undefinability of Well Order (SUDWO). SUDWO is a strengthening of the Undefinability of Well Order (UDWO). We prove that if is singular of countable cofinality, Karp's chain logic Karpintroduceschain is above L1, while it is already known that it satisfies UDWO and Interpolation. Moreover, we show that in these circumstances, the chain logic is -- in a sense -- maximal among logics with chain models to satisfy UDWO. We then show that the chain logic gives a partial solution to Problem 1.4. from Shelah's Sh797, which asked whether for singular of countable cofinality there was a logic strictly between L+, ω and L+, + having Interpolation. We show that modulo accepting as the upper bound a model class of L, , Karp's chain logic satisfies the required properties. In addition, we show that this chain logic is not -compact, a question that we have asked on various occasions. We contribue to the further development of chain logic by proving the Union Lemma and identifying the chain-independent fragment of the logic, showing that it still has considerable expressive power. In conclusion, we have shown that the simply defined chain logic emulates the logic L1 in satisfying Interpolation, undefinability of well-order and maximality with respect to it, and the Union Lemma. In addition it has a Completeness Theorem.