Model Theory of Local Real Closed SV-Rings of Finite Rank

Abstract

This note begins the model-theoretic study of local real closed SV-rings of finite rank; to this end, a structure theorem for reduced local SV-rings of finite rank is given and branching ideals in local real closed rings of finite rank are analysed. The class of local real closed SV-rings of rank n ∈ N≥ 2 is elementary in the language of rings L := \ +, -, ·, 0, 1 \ and its L -theory Tn has a model companion Tn,1 ; models of Tn,1 are n -fold fibre products (((V1 ×k V2) ×kV3) … ×k Vn-1)×k Vn of non-trivial real closed valuation rings Vi with isomorphic residue field k. The L -theory Tn,1 is complete, decidable, and NIP. After enriching L with a predicate for the maximal ideal, models of Tn have prime extensions in models of Tn,1 , and Tn,1 is the model completion of Tn in this enriched language. A quantifier elimination result for Tn,1 is also given. The class of those local real closed SV-rings of rank n∈ N≥ 2 which are n -fold fibre products (((V1 ×W V2) ×WV3) … ×W Vn-1)×W Vn of non-trivial real closed valuation rings Vi along surjective morphisms Vi W onto a non-trivial domain W is elementary in the language of rings, and its L -theory Tn,2 is also complete, decidable, and NIP; after enriching L with predicates for the maximal ideal and the unique branching ideal, Tn,2 is model complete.