The Keisler-Shelah isomorphism theorem and the continuum hypothesis II

Abstract

We continue the investigation started in [Sh:1215] about the relation between the Keilser-Shelah isomorphism theorem and the continuum hypothesis. In particular, we show it is consistent that the continuum hypothesis fails and for any given sequence m= (M1n, M2n: n < ω of models of size at most 1 in a countable language, if the sequence satisfies a mild extra property, then for every non-principal ultrafilter D on ω, if the ultraproducts Π D M1n and Π D M2n are elementarily equivalent, then they are isomorphic.

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