Bounds on Scott Ranks of Some Polish Metric Spaces

Abstract

If N is a proper Polish metric space and M is any countable dense submetric space of N, then the Scott rank of N in the natural first order language of metric spaces is countable and in fact at most ω1M + 1, where ω1M is the Church-Kleene ordinal of M (construed as a subset of ω) which is the least ordinal with no presentation on ω computable from M. If N is a rigid Polish metric space and M is any countable dense submetric space, then the Scott rank of N is countable and in fact less than ω1M.