Scott analysis, linear orders and almost periodic functions

Abstract

For any limit ordinal λ, we construct a linear order Lλ whose Scott complexity is λ+1. This completes the classification of the possible Scott sentence complexities of linear orderings. Previously, there was only one known construction of any structure (of any signature) with Scott complexity λ+1, and our construction gives new examples, e.g., rigid structures, of this complexity. Moreover, we can construct the linear orders Lλ so that not only does Lλ have Scott complexity λ+1, but there are continuum-many structures M λ Lλ and all such structures also have Scott complexity λ+1. In contrast, we demonstrate that there is no structure (of any signature) with Scott complexity λ+1 that is only λ-equivalent to structures with Scott complexity λ+1. Our construction is based on functions f Z N \∞\ which are almost periodic but not periodic, such as those arising from shifts of the p-adic valuations.