Quantitative tame properties of differentiable functions with controlled derivatives

Abstract: We show that differentiable functions, defined on a convex body K ⊆ R d , whose derivatives do not exceed a suitable given sequence of real numbers share many properties with polynomials. The role of the degree of a polynomial is hereby replaced by an integer associated with the given sequence of reals, the diameter of K, and a real parameter linked to the C 0 -norm of the function. We give quantitative information on the size of the zero set, show that it admits a local parameterization by Sobolev functions, … Show more