Defining new linear functions in tame expansions of the real ordered additive group

Abstract

We explore semibounded expansions of arbitrary ordered groups; namely, expansions that do not define a field on the whole universe. We introduce the notion of a semibounded expansion of an arbitrary ordered group, extending the usual notion from the o-minimal setting. For R=( R, <, +, …), a semibounded o-minimal structure and P⊂eq R a set satisfying certain tameness conditions, we discuss under which conditions ( R,P) defines total linear functions that are not definable in R. Examples of such structures that does define new total linear functions include the cases when R is a reduct of (R,<,+,· (0,1)2,(x λ x)λ∈ I⊂eq R), and P= 2Z, or P is an iteration sequence (for any I) or P=Z, for I=Q.

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