Structures in Familiar Classes Which Have Scott Rank ω1CK

Abstract

There are familiar examples of computable structures having various computable Scott ranks. There are also familiar structures, such as the Harrison ordering, which have Scott rank ω1CK+1. Makkai produced a structure of Scott rank ω1CK, which can be made computable, and simplified so that it is just a tree. In the present paper, we show that there are further computable structures of Scott rank ω1CK in the following classes: undirected graphs, fields of any characteristic, and linear orderings. The new examples share with the Harrison ordering, and the tree just mentioned, a strong approximability property.