A lower bound on the quantitative version of the transversality theorem
Abstract
The present paper studies a quantitative version of the transversality theorem. More precisely, given a continuous function f∈ C([0,1]d,Rm) and a manifold W⊂ Rm of dimension p, a sharpness result on the upper quantitative estimate of the (d+p-m)-dimensional Hausdorff measure of the set ZWf=\x∈ [0,1]d: f(x)∈ W\, which was achieved in [8], will be proved in terms of power functions.
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