The Morse-Sard theorem revisited

Abstract

Let n, m, k be positive integers with k=n-m+1. We establish an abstract Morse-Sard-type theorem which allows us to deduce, on the one hand, a previous result of De Pascale's for Sobolev Wk,ploc(Rn, Rm) functions with p>n and, on the other hand, also the following new result: if f∈ Ck-1(Rn, Rm) satisfies h 0|Dk-1f(x+h)-Dk-1f(x)||h|<∞ for every x∈Rn (that is, Dk-1f is a Stepanov function), then the set of critical values of f is Lebesgue-null in Rm. In the case that m=1 we also show that this limiting condition holding for every x∈Rn, where N is a set of zero (n-2+α)-dimensional Hausdorff measure for some 0<α<1, is sufficient to guarantee the same conclusion.