Multiplicative Valued Difference Fields

Abstract

The theory of valued difference fields (K, σ, v) depends on how the valuation v interacts with the automorphism σ. Two special cases have already been worked out - the isometric case, where v(σ(x)) = v(x) for all x∈ K, has been worked out by Luc Belair, Angus Macintyre and Thomas Scanlon; and the contractive case, where v(σ(x)) > n· v(x) for all n∈N and x∈ K× with v(x) > 0, has been worked out by Salih Azgin. In this paper we deal with a more general version, called the multiplicative case, where v(σ(x)) = · v(x), where (> 0) is interpreted as an element of a real-closed field. We give an axiomatization and prove a relative quantifier elimination theorem for such a theory.