On sets with rank one in simple homogeneous structures
Abstract
We study definable sets of SU-rank 1 in , where is a countable homogeneous and simple structure in a language with finite relational vocabulary. Each such can be seen as a `canonically embedded structure', which inherits all relations on which are definable in , and has no other definable relations. Our results imply that if no relation symbol of the language of has arity higher than 2, then there is a close relationship between triviality of dependence and being a reduct of a binary random structure. Somewhat more preciely: (a) if for every , every -type which is realized in is determined by its sub-2-types , then the algebraic closure restricted to is trivial; (b) if has trivial dependence, then is a reduct of a binary random structure.
Keywords
Cite
@article{arxiv.1403.3079,
title = {On sets with rank one in simple homogeneous structures},
author = {Ove Ahlman and Vera Koponen},
journal= {arXiv preprint arXiv:1403.3079},
year = {2015}
}