Non-archimedean stratifications in power bounded T-convex fields
Abstract
We show that functions definable in power bounded T-convex fields have the (multidimensional) Jacobian property. Building on work of I. Halupczok, this implies that a certain notion of non-archimedean stratifications is available in such valued fields. From the existence of these stratifications, we derive some applications in an archimedean o-minimal setting. As a minor result, we also show that if T is power bounded, the theory of T-convex valued fields is b-minimal with centres.
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