On -existence over a predicate
Abstract
We prove that in a countable theory T fully stable over a predicate P, any -complete set A has the -existence property. This means that A can be extended to a -saturated model of T without changing the P-part. The notion of -completeness, introduced in this paper, captures some obvious necessary conditions for such an extension to be possible (for example, the P-part of A has to be a -saturated model of the appropriate theory). So in a fully stable theory T, -existence can only fail for trivial reasons. This generalizes results of Chatzidakis in the context of difference fields of characteristic 0.
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