A dichotomy for T-convex fields with a monomial group
Abstract
We prove a dichotomy for o-minimal fields R, expanded by a T-convex valuation ring (where T is the theory of R) and a compatible monomial group. We show that if T is power bounded, then this expansion of R is model complete (assuming that T is), it has a distal theory, and the definable sets are geometrically tame. On the other hand, if R defines an exponential function, then the natural numbers are externally definable in our expansion, precluding any sort of model theoretic tameness.
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