On the modulus of continuity of functions whose image has positive measure, and metric embeddings into Rd without shrinking
Abstract
A generalization of the classical Sard theorem in the plane is the following. Let f be a function defined on a subset A⊂ R2. If f has modulus of continuity ω(r) r2, then f(A)⊂ R has Lebesgue measure zero. Choquet claimed in Choquet that this was a full characterization, i.e. for every ω for which ω(r)/r2 converges to ∞ as r 0, there is a counterexample. We disprove this by showing that the correct characterization, in Rd, is ∫01 ω(r)-1/d=∞. For the precise statement see Theorem 2. We obtain this as a special case of a more general result. We study which spaces (X,) can be embedded into Rd without decreasing any of the distances in X. That is, we ask the question whether there is an f: X Rd such that \|f(x)-f(y)\| (x,y) for every x,y∈ X. We study this problem for some very general distance functions (we do not even assume that it is a metric space, in particular, we do not assume that satisfies the triangle inequality), and find quantitative necessary and sufficient conditions under which such a mapping exists. We will obtain the characterization mentioned above as a special case of our metric embedding results, by choosing X to be an interval in R, and defining by putting (x,y)=r if \|x-y\|=ω(r).
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