Abstract
This paper is about omitting types in logic of metric structures introduced by Ben Yaacov, Berenstein, Henson and Usvyatsov. While a complete type is omissible in some model of a countable complete theory if and only if it is not principal, this is not true for the incomplete types by a result of Ben Yaacov. We prove that there is no simple test for determining whether a type is omissible in a model of a theory T in a countable language. More precisely, we find a theory in a countable language such that the set of types omissible in some of its models is a complete ∑2 1 set and a complete theory in a countable language such that the set of types omissible in some of its models is a complete π1 1 set. Two more unexpected examples are given: (i) a complete theory T and a countable set of types such that each of its finite sets is jointly omissible in a model of T, but the whole set is not and (ii) a complete theory and two types that are separately omissible, but not jointly omissible, in its models.
| Original language | English |
|---|---|
| Article number | 1850006 |
| Journal | Journal of Mathematical Logic |
| Volume | 18 |
| Issue number | 2 |
| DOIs | |
| State | Published - 1 Dec 2018 |
Bibliographical note
Publisher Copyright:© 2018 World Scientific Publishing Company.
Keywords
- Logic of metric structures
- complete π sets
- complete ∑ sets
- omitting types