Hanf Number for Scott Sentences of Computable Structures
Abstract
The Hanf number for a set S of sentences in Lω1,ω (or some other logic) is the least infinite cardinal such that for all ∈ S, if has models in all infinite cardinalities less than , then it has models of all infinite cardinalities. S-D. Friedman asked what is the Hanf number for Scott sentences of computable structures. We show that the value is ω1CK. The same argument proves that ω1CK is the Hanf number for Scott sentences of hyperarithmetical structures.
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