Uniform Bounds in D-Minimal Structures
Abstract
Let R be an expansion of the real field such that every subset of R definable in R either has interior or is a finite union of discrete sets. Answering a question by Chris Miller, we show that for every n∈ N and every definable subset A⊂eq Rn+1 there is N∈ N such that for all x∈ Rn either Ax has interior or is the union of N discrete sets.
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