Measuring definable sets in o-minimal fields
Abstract
We introduce a non real-valued measure on the definable sets contained in the finite part of a cartesian power of an o-minimal field R. The measure takes values in an ordered semiring, the Dedekind completion of a quotient of R. We show that every measurable subset of Rn with non-empty interior has positive measure, and that the measure is preserved by definable C1-diffeomorphisms with Jacobian determinant equal to 1.
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